Internet-Draft The AEGIS Family of Authenticated Encryp December 2024
Denis & Lucas Expires 15 June 2025 [Page]
Workgroup:
Crypto Forum
Internet-Draft:
draft-irtf-cfrg-aegis-aead-14
Published:
Intended Status:
Informational
Expires:
Authors:
F. Denis
Fastly Inc.
S. Lucas
Individual Contributor

The AEGIS Family of Authenticated Encryption Algorithms

Abstract

This document describes the AEGIS-128L, AEGIS-256, AEGIS-128X, and AEGIS-256X AES-based authenticated encryption algorithms designed for high-performance applications.

The document is a product of the Crypto Forum Research Group (CFRG). It is not an IETF product and is not a standard.

Discussion Venues

This note is to be removed before publishing as an RFC.

Source for this draft and an issue tracker can be found at https://github.com/cfrg/draft-irtf-cfrg-aegis-aead.

Status of This Memo

This Internet-Draft is submitted in full conformance with the provisions of BCP 78 and BCP 79.

Internet-Drafts are working documents of the Internet Engineering Task Force (IETF). Note that other groups may also distribute working documents as Internet-Drafts. The list of current Internet-Drafts is at https://datatracker.ietf.org/drafts/current/.

Internet-Drafts are draft documents valid for a maximum of six months and may be updated, replaced, or obsoleted by other documents at any time. It is inappropriate to use Internet-Drafts as reference material or to cite them other than as "work in progress."

This Internet-Draft will expire on 15 June 2025.

Table of Contents

1. Introduction

This document describes the AEGIS family of authenticated encryption with associated data (AEAD) algorithms [AEGIS], which were chosen for high-performance applications in the CAESAR (Competition for Authenticated Encryption: Security, Applicability, and Robustness) competition.

Among the finalists, AEGIS-128 was chosen as the winner for this category. However, AEGIS-128L, another finalist, offers enhanced performance and a stronger security margin [ENP19] [JLD21] [LIMS21] [STSI23]. Additionally, AEGIS-256, which also reached the final round, provides 256-bit security and supports higher usage limits.

Therefore, this document specifies the following variants:

All variants are inverse-free and constructed from the AES encryption round function [FIPS-AES].

The AEGIS cipher family offers performance that significantly exceeds that of AES-GCM on CPUs with AES instructions. Similarly, software implementations not using AES instructions can also be faster, although to a lesser extent.

Unlike with AES-GCM, nonces can be safely chosen at random with no practical limit when using AEGIS-256 and AEGIS-256X. AEGIS-128L and AEGIS-128X also allow for more messages to be safely encrypted when using random nonces.

With some existing AEAD schemes, such as AES-GCM, an attacker can generate a ciphertext that successfully decrypts under multiple different keys (a partitioning oracle attack) [LGR21]. This ability to craft a (ciphertext, authentication tag) pair that verifies under multiple keys significantly reduces the number of required interactions with the oracle to perform an exhaustive search, making it practical if the key space is small. For example, with password-based encryption, an attacker can guess a large number of passwords at a time by recursively submitting such a ciphertext to an oracle, which speeds up a password search by reducing it to a binary search.

In AEGIS, finding distinct (key, nonce) pairs that successfully decrypt a given (associated data, ciphertext, authentication tag) tuple is believed to have a complexity that depends on the tag size. A 128-bit tag provides 64-bit committing security, which is generally acceptable for interactive protocols. With a 256-bit tag, finding a collision becomes impractical.

Unlike most other AES-based AEAD constructions, leaking a state does not leak the key or previous states.

Finally, an AEGIS key is not required after the initialization function, and there is no key schedule. Thus, ephemeral keys can be erased from memory before any data has been encrypted or decrypted, mitigating cold boot attacks.

Note that an earlier version of Hongjun Wu and Bart Preneel’s paper introducing AEGIS specified AEGIS-128L and AEGIS-256 sporting differences with regards to the computation of the authentication tag and the number of state updates in the Finalize() function. We follow the specification of [AEGIS], which can be found in the References section of this document.

2. Conventions and Definitions

The key words “MUST”, “MUST NOT”, “REQUIRED”, “SHALL”, “SHALL NOT”, “SHOULD”, “SHOULD NOT”, “RECOMMENDED”, “NOT RECOMMENDED”, “MAY”, and “OPTIONAL” in this document are to be interpreted as described in BCP 14 [RFC2119] [RFC8174] when, and only when, they appear in all capitals, as shown here.

Throughout this document, “byte” is used interchangeably with “octet” and refers to an 8-bit sequence.

Primitives:

AEGIS internal functions:

Input blocks are 256 bits for AEGIS-128L and 128 bits for AEGIS-256.

AES blocks:

AES blocks are always 128 bits in length.

Input and output values:

3. The AEGIS-128L Algorithm

AEGIS-128L has a 1024-bit state, made of eight 128-bit blocks {S0, ...S7}.

The parameters for this algorithm, whose meaning is defined in [RFC5116], Section 4 are:

Distinct associated data inputs, as described in [RFC5116], Section 3 shall be unambiguously encoded as a single input. It is up to the application to create a structure in the associated data input if needed.

3.1. Authenticated Encryption

Encrypt(msg, ad, key, nonce)

The Encrypt function encrypts a message and returns the ciphertext along with an authentication tag that verifies the authenticity of the message and associated data, if provided.

Security:

  • For a given key, the nonce MUST NOT be reused under any circumstances; doing so allows an attacker to recover the internal state.

  • The key MUST be randomly chosen from a uniform distribution.

Inputs:

  • msg: the message to be encrypted (length MUST be less than or equal to P_MAX).

  • ad: the associated data to authenticate (length MUST be less than or equal to A_MAX).

  • key: the encryption key.

  • nonce: the public nonce.

Outputs:

  • ct: the ciphertext.

  • tag: the authentication tag.

Steps:

Init(key, nonce)

ct = {}

ad_blocks = Split(ZeroPad(ad, 256), 256)
for ai in ad_blocks:
    Absorb(ai)

msg_blocks = Split(ZeroPad(msg, 256), 256)
for xi in msg_blocks:
    ct = ct || Enc(xi)

tag = Finalize(|ad|, |msg|)
ct = Truncate(ct, |msg|)

return ct and tag

3.2. Authenticated Decryption

Decrypt(ct, tag, ad, key, nonce)

The Decrypt function decrypts a ciphertext, verifies that the authentication tag is correct, and returns the message on success or an error if tag verification failed.

Security:

  • If tag verification fails, the decrypted message and wrong message authentication tag MUST NOT be given as output. The decrypted message MUST be overwritten with zeros before being returned.

  • The comparison of the input tag with the expected_tag MUST be done in constant time.

Inputs:

  • ct: the ciphertext to be decrypted (length MUST be less than or equal to C_MAX).

  • tag: the authentication tag.

  • ad: the associated data to authenticate (length MUST be less than or equal to A_MAX).

  • key: the encryption key.

  • nonce: the public nonce.

Outputs:

  • Either the decrypted message msg or an error indicating that the authentication tag is invalid for the given inputs.

Steps:

Init(key, nonce)

msg = {}

ad_blocks = Split(ZeroPad(ad, 256), 256)
for ai in ad_blocks:
    Absorb(ai)

ct_blocks = Split(ct, 256)
cn = Tail(ct, |ct| mod 256)

for ci in ct_blocks:
    msg = msg || Dec(ci)

if cn is not empty:
    msg = msg || DecPartial(cn)

expected_tag = Finalize(|ad|, |msg|)

if CtEq(tag, expected_tag) is False:
    erase msg
    return "verification failed" error
else:
    return msg

3.3. The Init Function

Init(key, nonce)

The Init function constructs the initial state {S0, ...S7} using the given key and nonce.

Inputs:

  • key: the encryption key.

  • nonce: the public nonce.

Defines:

  • {S0, ...S7}: the initial state.

Steps:

S0 = key ^ nonce
S1 = C1
S2 = C0
S3 = C1
S4 = key ^ nonce
S5 = key ^ C0
S6 = key ^ C1
S7 = key ^ C0

Repeat(10, Update(nonce, key))

3.4. The Update Function

Update(M0, M1)

The Update function is the core of the AEGIS-128L algorithm. It updates the state {S0, ...S7} using two 128-bit values.

Inputs:

  • M0: the first 128-bit block to be absorbed.

  • M1: the second 128-bit block to be absorbed.

Modifies:

  • {S0, ...S7}: the state.

Steps:

S'0 = AESRound(S7, S0 ^ M0)
S'1 = AESRound(S0, S1)
S'2 = AESRound(S1, S2)
S'3 = AESRound(S2, S3)
S'4 = AESRound(S3, S4 ^ M1)
S'5 = AESRound(S4, S5)
S'6 = AESRound(S5, S6)
S'7 = AESRound(S6, S7)

S0  = S'0
S1  = S'1
S2  = S'2
S3  = S'3
S4  = S'4
S5  = S'5
S6  = S'6
S7  = S'7

3.5. The Absorb Function

Absorb(ai)

The Absorb function absorbs a 256-bit input block ai into the state {S0, ...S7}.

Inputs:

  • ai: the 256-bit input block.

Steps:

t0, t1 = Split(ai, 128)
Update(t0, t1)

3.6. The Enc Function

Enc(xi)

The Enc function encrypts a 256-bit input block xi using the state {S0, ...S7}.

Inputs:

  • xi: the 256-bit input block.

Outputs:

  • ci: the 256-bit encrypted block.

Steps:

z0 = S6 ^ S1 ^ (S2 & S3)
z1 = S2 ^ S5 ^ (S6 & S7)

t0, t1 = Split(xi, 128)
out0 = t0 ^ z0
out1 = t1 ^ z1

Update(t0, t1)
ci = out0 || out1

return ci

3.7. The Dec Function

Dec(ci)

The Dec function decrypts a 256-bit input block ci using the state {S0, ...S7}.

Inputs:

  • ci: the 256-bit encrypted block.

Outputs:

  • xi: the 256-bit decrypted block.

Steps:

z0 = S6 ^ S1 ^ (S2 & S3)
z1 = S2 ^ S5 ^ (S6 & S7)

t0, t1 = Split(ci, 128)
out0 = t0 ^ z0
out1 = t1 ^ z1

Update(out0, out1)
xi = out0 || out1

return xi

3.8. The DecPartial Function

DecPartial(cn)

The DecPartial function decrypts the last ciphertext bits cn using the state {S0, ...S7} when they do not fill an entire block.

Inputs:

  • cn: the encrypted input.

Outputs:

  • xn: the decryption of cn.

Steps:

z0 = S6 ^ S1 ^ (S2 & S3)
z1 = S2 ^ S5 ^ (S6 & S7)

t0, t1 = Split(ZeroPad(cn, 256), 128)
out0 = t0 ^ z0
out1 = t1 ^ z1

xn = Truncate(out0 || out1, |cn|)

v0, v1 = Split(ZeroPad(xn, 256), 128)
Update(v0, v1)

return xn

3.9. The Finalize Function

Finalize(ad_len_bits, msg_len_bits)

The Finalize function computes a 128- or 256-bit tag that authenticates the message and associated data.

Inputs:

  • ad_len_bits: the length of the associated data in bits.

  • msg_len_bits: the length of the message in bits.

Outputs:

  • tag: the authentication tag.

Steps:

t = S2 ^ (LE64(ad_len_bits) || LE64(msg_len_bits))

Repeat(7, Update(t, t))

if tag_length_bits == 128:
    tag = S0 ^ S1 ^ S2 ^ S3 ^ S4 ^ S5 ^ S6
else:                # 256 bits
    tag = (S0 ^ S1 ^ S2 ^ S3) || (S4 ^ S5 ^ S6 ^ S7)

return tag

4. The AEGIS-256 Algorithm

AEGIS-256 has a 768-bit state, made of six 128-bit blocks {S0, ...S5}.

The parameters for this algorithm, whose meaning is defined in [RFC5116], Section 4 are:

Distinct associated data inputs, as described in [RFC5116], Section 3 shall be unambiguously encoded as a single input. It is up to the application to create a structure in the associated data input if needed.

4.1. Authenticated Encryption

Encrypt(msg, ad, key, nonce)

The Encrypt function encrypts a message and returns the ciphertext along with an authentication tag that verifies the authenticity of the message and associated data, if provided.

Security:

  • For a given key, the nonce MUST NOT be reused under any circumstances; doing so allows an attacker to recover the internal state.

  • The key MUST be randomly chosen from a uniform distribution.

Inputs:

  • msg: the message to be encrypted (length MUST be less than or equal to P_MAX).

  • ad: the associated data to authenticate (length MUST be less than or equal to A_MAX).

  • key: the encryption key.

  • nonce: the public nonce.

Outputs:

  • ct: the ciphertext.

  • tag: the authentication tag.

Steps:

Init(key, nonce)

ct = {}

ad_blocks = Split(ZeroPad(ad, 128), 128)
for ai in ad_blocks:
    Absorb(ai)

msg_blocks = Split(ZeroPad(msg, 128), 128)
for xi in msg_blocks:
    ct = ct || Enc(xi)

tag = Finalize(|ad|, |msg|)
ct = Truncate(ct, |msg|)

return ct and tag

4.2. Authenticated Decryption

Decrypt(ct, tag, ad, key, nonce)

The Decrypt function decrypts a ciphertext, verifies that the authentication tag is correct, and returns the message on success or an error if tag verification failed.

Security:

  • If tag verification fails, the decrypted message and wrong message authentication tag MUST NOT be given as output. The decrypted message MUST be overwritten with zeros before being returned.

  • The comparison of the input tag with the expected_tag MUST be done in constant time.

Inputs:

  • ct: the ciphertext to be decrypted (length MUST be less than or equal to C_MAX).

  • tag: the authentication tag.

  • ad: the associated data to authenticate (length MUST be less than or equal to A_MAX).

  • key: the encryption key.

  • nonce: the public nonce.

Outputs:

  • Either the decrypted message msg or an error indicating that the authentication tag is invalid for the given inputs.

Steps:

Init(key, nonce)

msg = {}

ad_blocks = Split(ZeroPad(ad, 128), 128)
for ai in ad_blocks:
    Absorb(ai)

ct_blocks = Split(ZeroPad(ct, 128), 128)
cn = Tail(ct, |ct| mod 128)

for ci in ct_blocks:
    msg = msg || Dec(ci)

if cn is not empty:
    msg = msg || DecPartial(cn)

expected_tag = Finalize(|ad|, |msg|)

if CtEq(tag, expected_tag) is False:
    erase msg
    return "verification failed" error
else:
    return msg

4.3. The Init Function

Init(key, nonce)

The Init function constructs the initial state {S0, ...S5} using the given key and nonce.

Inputs:

  • key: the encryption key.

  • nonce: the public nonce.

Defines:

  • {S0, ...S5}: the initial state.

Steps:

k0, k1 = Split(key, 128)
n0, n1 = Split(nonce, 128)

S0 = k0 ^ n0
S1 = k1 ^ n1
S2 = C1
S3 = C0
S4 = k0 ^ C0
S5 = k1 ^ C1

Repeat(4,
  Update(k0)
  Update(k1)
  Update(k0 ^ n0)
  Update(k1 ^ n1)
)

4.4. The Update Function

Update(M)

The Update function is the core of the AEGIS-256 algorithm. It updates the state {S0, ...S5} using a 128-bit value.

Inputs:

  • msg: the block to be absorbed.

Modifies:

  • {S0, ...S5}: the state.

Steps:

S'0 = AESRound(S5, S0 ^ M)
S'1 = AESRound(S0, S1)
S'2 = AESRound(S1, S2)
S'3 = AESRound(S2, S3)
S'4 = AESRound(S3, S4)
S'5 = AESRound(S4, S5)

S0  = S'0
S1  = S'1
S2  = S'2
S3  = S'3
S4  = S'4
S5  = S'5

4.5. The Absorb Function

Absorb(ai)

The Absorb function absorbs a 128-bit input block ai into the state {S0, ...S5}.

Inputs:

  • ai: the input block.

Steps:

Update(ai)

4.6. The Enc Function

Enc(xi)

The Enc function encrypts a 128-bit input block xi using the state {S0, ...S5}.

Inputs:

  • xi: the input block.

Outputs:

  • ci: the encrypted input block.

Steps:

z = S1 ^ S4 ^ S5 ^ (S2 & S3)

Update(xi)

ci = xi ^ z

return ci

4.7. The Dec Function

Dec(ci)

The Dec function decrypts a 128-bit input block ci using the state {S0, ...S5}.

Inputs:

  • ci: the encrypted input block.

Outputs:

  • xi: the decrypted block.

Steps:

z = S1 ^ S4 ^ S5 ^ (S2 & S3)

xi = ci ^ z

Update(xi)

return xi

4.8. The DecPartial Function

DecPartial(cn)

The DecPartial function decrypts the last ciphertext bits cn using the state {S0, ...S5} when they do not fill an entire block.

Inputs:

  • cn: the encrypted input.

Outputs:

  • xn: the decryption of cn.

Steps:

z = S1 ^ S4 ^ S5 ^ (S2 & S3)

t = ZeroPad(cn, 128)
out = t ^ z

xn = Truncate(out, |cn|)

v = ZeroPad(xn, 128)
Update(v)

return xn

4.9. The Finalize Function

Finalize(ad_len_bits, msg_len_bits)

The Finalize function computes a 128- or 256-bit tag that authenticates the message and associated data.

Inputs:

  • ad_len_bits: the length of the associated data in bits.

  • msg_len_bits: the length of the message in bits.

Outputs:

  • tag: the authentication tag.

Steps:

t = S3 ^ (LE64(ad_len_bits) || LE64(msg_len_bits))

Repeat(7, Update(t))

if tag_length_bits == 128:
    tag = S0 ^ S1 ^ S2 ^ S3 ^ S4 ^ S5
else:                # 256 bits
    tag = (S0 ^ S1 ^ S2) || (S3 ^ S4 ^ S5)

return tag

5. Parallel Modes

Some CPUs, such as Intel and Intel-compatible CPUs with the VAES extensions, include instructions to efficiently apply the AES round function to a vector of AES blocks.

AEGIS-128X and AEGIS-256X are optional, specialized modes designed to take advantage of these instructions. They share the same properties as the ciphers they are based on but can be significantly faster on these platforms, even for short messages.

AEGIS-128X and AEGIS-256X are parallel evaluations of multiple AEGIS-128L and AEGIS-256 instances respectively, with distinct initial states. On CPUs with wide vector registers, different states can be stored in different 128-bit lanes of the same vector register, allowing parallel updates using vector instructions.

The modes are parameterized by the parallelism degree. With 256-bit registers, 2 parallel operations can be applied to 128-bit AES blocks. With 512-bit registers, the number of instances can be raised to 4.

The state of a parallel mode is represented as a vector of AEGIS-128L or AEGIS-256 states.

5.1. Additional Conventions and Definitions

  • D: the degree of parallelism.

  • R: the absorption and output rate of the mode. With AEGIS-128X, the rate is 256 * D bits. With AEGIS-256X, the rate is 128 * D bits.

  • V[j,i]: the j-th AES block of the i-th state. i is in the [0..D) range. For AEGIS-128X, j is in the [0..8) range, while for AEGIS-256, j is in the [0..6) range.

  • V'[j,i]: the j-th AES block of the next i-th state.

  • ctx[i]: the i-th context separator. This is a 128-bit mask, made of a byte representing the state index, followed by a byte representing the highest index and 112 all-zero bits.

  • Byte(x): the value x encoded as 8 bits.

5.2. Authenticated Encryption

Encrypt(msg, ad, key, nonce)

The Encrypt function of AEGIS-128X resembles that of AEGIS-128L, and similarly, the Encrypt function of AEGIS-256X mirrors that of AEGIS-256, but processes R-bit input blocks per update.

Steps:

Init(key, nonce)

ct = {}

ad_blocks = Split(ZeroPad(ad, R), R)
for ai in ad_blocks:
    Absorb(ai)

msg_blocks = Split(ZeroPad(msg, R), R)
for xi in msg_blocks:
    ct = ct || Enc(xi)

tag = Finalize(|ad|, |msg|)
ct = Truncate(ct, |msg|)

return ct and tag

5.3. Authenticated Decryption

Decrypt(ct, tag, ad, key, nonce)

The Decrypt function of AEGIS-128X resembles that of AEGIS-128L, and similarly, the Decrypt function of AEGIS-256X mirrors that of AEGIS-256, but processes R-bit input blocks per update.

Steps:

Init(key, nonce)

msg = {}

ad_blocks = Split(ZeroPad(ad, R), R)
for ai in ad_blocks:
    Absorb(ai)

ct_blocks = Split(ct, R)
cn = Tail(ct, |ct| mod R)

for ci in ct_blocks:
    msg = msg || Dec(ci)

if cn is not empty:
    msg = msg || DecPartial(cn)

expected_tag = Finalize(|ad|, |msg|)

if CtEq(tag, expected_tag) is False:
    erase msg
    return "verification failed" error
else:
    return msg

5.4. AEGIS-128X

5.4.1. The Init Function

Init(key, nonce)

The Init function initializes a vector of D AEGIS-128L states with the same key and nonce but a different context ctx[i]. The context is added to the state before every update.

Steps:

for i in 0..D:
    V[0,i] = key ^ nonce
    V[1,i] = C1
    V[2,i] = C0
    V[3,i] = C1
    V[4,i] = key ^ nonce
    V[5,i] = key ^ C0
    V[6,i] = key ^ C1
    V[7,i] = key ^ C0

nonce_v = {}
key_v = {}
for i in 0..D:
    nonce_v = nonce_v || nonce
    key_v = key_v || key

for i in 0..D:
    ctx[i] = ZeroPad(Byte(i) || Byte(D - 1), 128)

Repeat(10,
    for i in 0..D:
        V[3,i] = V[3,i] ^ ctx[i]
        V[7,i] = V[7,i] ^ ctx[i]

    Update(nonce_v, key_v)
)

5.4.2. The Update Function

Update(M0, M1)

The AEGIS-128X Update function is similar to the AEGIS-128L Update function, but absorbs R (= 256 * D) bits at once. M0 and M1 are 128 * D bits instead of 128 bits but are split into 128-bit blocks, each of them updating a different AEGIS-128L state.

Steps:

m0 = Split(M0, 128)
m1 = Split(M1, 128)

for i in 0..D:
    V'[0,i] = AESRound(V[7,i], V[0,i] ^ m0[i])
    V'[1,i] = AESRound(V[0,i], V[1,i])
    V'[2,i] = AESRound(V[1,i], V[2,i])
    V'[3,i] = AESRound(V[2,i], V[3,i])
    V'[4,i] = AESRound(V[3,i], V[4,i] ^ m1[i])
    V'[5,i] = AESRound(V[4,i], V[5,i])
    V'[6,i] = AESRound(V[5,i], V[6,i])
    V'[7,i] = AESRound(V[6,i], V[7,i])

    V[0,i]  = V'[0,i]
    V[1,i]  = V'[1,i]
    V[2,i]  = V'[2,i]
    V[3,i]  = V'[3,i]
    V[4,i]  = V'[4,i]
    V[5,i]  = V'[5,i]
    V[6,i]  = V'[6,i]
    V[7,i]  = V'[7,i]

5.4.3. The Absorb Function

Absorb(ai)

The Absorb function is similar to the AEGIS-128L Absorb function, but absorbs R bits instead of 256 bits.

Steps:

t0, t1 = Split(ai, R)
Update(t0, t1)

5.4.4. The Enc Function

Enc(xi)

The Enc function is similar to the AEGIS-128L Enc function, but encrypts R bits instead of 256 bits.

Steps:

z0 = {}
z1 = {}
for i in 0..D:
    z0 = z0 || (V[6,i] ^ V[1,i] ^ (V[2,i] & V[3,i]))
    z1 = z1 || (V[2,i] ^ V[5,i] ^ (V[6,i] & V[7,i]))

t0, t1 = Split(xi, R)
out0 = t0 ^ z0
out1 = t1 ^ z1

Update(t0, t1)
ci = out0 || out1

return ci

5.4.5. The Dec Function

Dec(ci)

The Dec function is similar to the AEGIS-128L Dec function, but decrypts R bits instead of 256 bits.

Steps:

z0 = {}
z1 = {}
for i in 0..D:
    z0 = z0 || (V[6,i] ^ V[1,i] ^ (V[2,i] & V[3,i]))
    z1 = z1 || (V[2,i] ^ V[5,i] ^ (V[6,i] & V[7,i]))

t0, t1 = Split(ci, R)
out0 = t0 ^ z0
out1 = t1 ^ z1

Update(out0, out1)
xi = out0 || out1

return xi

5.4.6. The DecPartial Function

DecPartial(cn)

The DecPartial function is similar to the AEGIS-128L DecPartial function, but decrypts up to R bits instead of 256 bits.

Steps:

z0 = {}
z1 = {}
for i in 0..D:
    z0 = z0 || (V[6,i] ^ V[1,i] ^ (V[2,i] & V[3,i]))
    z1 = z1 || (V[2,i] ^ V[5,i] ^ (V[6,i] & V[7,i]))

t0, t1 = Split(ZeroPad(cn, R), 128 * D)
out0 = t0 ^ z0
out1 = t1 ^ z1

xn = Truncate(out0 || out1, |cn|)

v0, v1 = Split(ZeroPad(xn, R), 128 * D)
Update(v0, v1)

return xn

5.4.7. The Finalize Function

Finalize(ad_len_bits, msg_len_bits)

The Finalize function finalizes every AEGIS-128L instance and combines the resulting authentication tags using the bitwise exclusive OR operation.

Steps:

t = {}
u = LE64(ad_len_bits) || LE64(msg_len_bits)
for i in 0..D:
    t = t || (V[2,i] ^ u)

Repeat(7, Update(t, t))

if tag_length_bits == 128:
    tag = ZeroPad({}, 128)
    for i in 0..D:
        ti = V[0,i] ^ V[1,i] ^ V[2,i] ^ V[3,i] ^ V[4,i] ^ V[5,i] ^ V[6,i]
        tag = tag ^ ti

else:                # 256 bits
    ti0 = ZeroPad({}, 128)
    ti1 = ZeroPad({}, 128)
    for i in 0..D:
        ti0 = ti0 ^ V[0,i] ^ V[1,i] ^ V[2,i] ^ V[3,i]
        ti1 = ti1 ^ V[4,i] ^ V[5,i] ^ V[6,i] ^ V[7,i]
    tag = ti0 || ti1

return tag

5.5. AEGIS-256X

5.5.1. The Init Function

Init(key, nonce)

The Init function initializes a vector of D AEGIS-256 states with the same key and nonce but a different context ctx[i]. The context is added to the state before every update.

Steps:

k0, k1 = Split(key, 128)
n0, n1 = Split(nonce, 128)

for i in 0..D:
    V[0,i] = k0 ^ n0
    V[1,i] = k1 ^ n1
    V[2,i] = C1
    V[3,i] = C0
    V[4,i] = k0 ^ C0
    V[5,i] = k1 ^ C1

k0_v, k1_v = {}, {}
k0n0_v, k1n1_v = {}, {}
for i in 0..D:
    k0_v = k0_v || k0
    k1_v = k1_v || k1
    k0n0_v = k0n0_v || (k0 ^ n0)
    k1n1_v = k1n1_v || (k1 ^ n1)

for i in 0..D:
    ctx[i] = ZeroPad(Byte(i) || Byte(D - 1), 128)

Repeat(4,
    for i in 0..D:
        V[3,i] = V[3,i] ^ ctx[i]
        V[5,i] = V[5,i] ^ ctx[i]

    Update(k0_v)
    for i in 0..D:
        V[3,i] = V[3,i] ^ ctx[i]
        V[5,i] = V[5,i] ^ ctx[i]

    Update(k1_v)
    for i in 0..D:
        V[3,i] = V[3,i] ^ ctx[i]
        V[5,i] = V[5,i] ^ ctx[i]

    Update(k0n0_v)
    for i in 0..D:
        V[3,i] = V[3,i] ^ ctx[i]
        V[5,i] = V[5,i] ^ ctx[i]

    Update(k1n1_v)
)

5.5.2. The Update Function

Update(M)

The AEGIS-256X Update function is similar to the AEGIS-256 Update function, but absorbs R (128 * D) bits at once. M is 128 * D bits instead of 128 bits and is split into 128-bit blocks, each of them updating a different AEGIS-256 state.

Steps:

m = Split(M, 128)

for i in 0..D:
    V'[0,i] = AESRound(V[5,i], V[0,i] ^ m[i])
    V'[1,i] = AESRound(V[0,i], V[1,i])
    V'[2,i] = AESRound(V[1,i], V[2,i])
    V'[3,i] = AESRound(V[2,i], V[3,i])
    V'[4,i] = AESRound(V[3,i], V[4,i])
    V'[5,i] = AESRound(V[4,i], V[5,i])

    V[0,i]  = V'[0,i]
    V[1,i]  = V'[1,i]
    V[2,i]  = V'[2,i]
    V[3,i]  = V'[3,i]
    V[4,i]  = V'[4,i]
    V[5,i]  = V'[5,i]

5.5.3. The Absorb Function

Absorb(ai)

The Absorb function is similar to the AEGIS-256 Absorb function, but absorbs R bits instead of 128 bits.

Steps:

Update(ai)

5.5.4. The Enc Function

Enc(xi)

The Enc function is similar to the AEGIS-256 Enc function, but encrypts R bits instead of 128 bits.

Steps:

z = {}
for i in 0..D:
    z = z || (V[1,i] ^ V[4,i] ^ V[5,i] ^ (V[2,i] & V[3,i]))

Update(xi)

ci = xi ^ z

return ci

5.5.5. The Dec Function

Dec(ci)

The Dec function is similar to the AEGIS-256 Dec function, but decrypts R bits instead of 128 bits.

Steps:

z = {}
for i in 0..D:
    z = z || (V[1,i] ^ V[4,i] ^ V[5,i] ^ (V[2,i] & V[3,i]))

xi = ci ^ z

Update(xi)

return xi

5.5.6. The DecPartial Function

DecPartial(cn)

The DecPartial function is similar to the AEGIS-256 DecPartial function, but decrypts up to R bits instead of 128 bits.

Steps:

z = {}
for i in 0..D:
    z = z || (V[1,i] ^ V[4,i] ^ V[5,i] ^ (V[2,i] & V[3,i]))

t = ZeroPad(cn, R)
out = t ^ z

xn = Truncate(out, |cn|)

v = ZeroPad(xn, 128 * D)
Update(v)

return xn

5.5.7. The Finalize Function

Finalize(ad_len_bits, msg_len_bits)

The Finalize function finalizes every AEGIS-256 instance and combines the resulting authentication tags using the bitwise exclusive OR operation.

Steps:

t = {}
u = LE64(ad_len_bits) || LE64(msg_len_bits)
for i in 0..D:
    t = t || (V[3,i] ^ u)

Repeat(7, Update(t))

if tag_length_bits == 128:
    tag = ZeroPad({}, 128)
    for i in 0..D:
        ti = V[0,i] ^ V[1,i] ^ V[2,i] ^ V[3,i] ^ V[4,i] ^ V[5,i]
        tag = tag ^ ti

else:                # 256 bits
    ti0 = ZeroPad({}, 128)
    ti1 = ZeroPad({}, 128)
    for i in 0..D:
        ti0 = ti0 ^ V[0,i] ^ V[1,i] ^ V[2,i]
        ti1 = ti1 ^ V[3,i] ^ V[4,i] ^ V[5,i]
    tag = ti0 || ti1

return tag

5.6. Implementation Considerations

AEGIS-128X and AEGIS-256X with a degree of 1 are identical to AEGIS-128L and AEGIS-256. This property can be used to reduce the size of a generic implementation.

In AEGIS-128X, V can be represented as eight 256-bit registers (when D = 2) or eight 512-bit registers (when D = 4). In AEGIS-256X, V can be represented as six 256-bit registers (when D = 2) or six 512-bit registers (when D = 4). With this representation, loops over 0..D in the above pseudocode can be replaced by vector instructions.

5.7. Operational Considerations

The AEGIS parallel modes are specialized and can only improve performance on specific CPUs.

The degrees of parallelism implementations are encouraged to support are 2 (for CPUs with 256-bit registers) and 4 (for CPUs with 512-bit registers). The resulting algorithms are called AEGIS-128X2, AEGIS-128X4, AEGIS-256X2, and AEGIS-256X4.

The following table summarizes how many bits are processed in parallel (rate), the memory requirements (state size), and the minimum vector register sizes a CPU should support for optimal performance.

Table 1
Algorithm Rate (bits) Optimal Register Size State Size (bits)
AEGIS-128L 256 128 bits 1024
AEGIS-128X2 512 256 bits 2048
AEGIS-128X4 1024 512 bits 4096
AEGIS-256 128 128 bits 768
AEGIS-256X2 256 256 bits 1536
AEGIS-256X4 512 512 bits 3072

Note that architectures with smaller vector registers but with many registers and large pipelines may still benefit from the parallel modes.

Protocols SHOULD opt for a parallel mode only when all the involved parties agree on a specific variant. AEGIS-128L and AEGIS-256 SHOULD remain the default choices.

Implementations MAY choose not to include the parallel AEGIS modes.

6. Encoding (ct, tag) Tuples

Applications MAY keep the ciphertext and the authentication tag in distinct structures or encode both as a single string.

In the latter case, the tag MUST immediately follow the ciphertext:

combined_ct = ct || tag

7. AEGIS as a Stream Cipher

All AEGIS variants can also be used as stream ciphers.

Stream(len, key, nonce)

The Stream function expands a key and an optional nonce into a variable-length, secure keystream.

Inputs:

Outputs:

Steps:

stream, tag = Encrypt(ZeroPad({}, len), {}, key, nonce)

return stream

This is equivalent to encrypting a len all-zero bits message without associated data, and discarding the authentication tag.

Instead of relying on the generic Encrypt function, implementations can skip the finalization step.

After initialization, the Update function is called with constant parameters, allowing further optimizations.

8. AEGIS as a Message Authentication Code

All AEGIS variants can be used to construct a MAC.

For all the variants, the Mac function takes a key, a nonce, and data as input, and produces a 128- or 256-bit tag as output.

Mac(data, key, nonce)

Security:

Inputs:

Outputs:

8.1. AEGISMAC-128L

AEGISMAC-128L refers to the Mac function based on the building blocks of AEGIS-128L.

Steps:

Init(key, nonce)
data_blocks = Split(ZeroPad(data, 256), 256)
for di in data_blocks:
    Absorb(di)
tag = Finalize(|data|, tag_length_bits)
return tag

8.2. AEGISMAC-256

AEGISMAC-256 refers to the Mac function based on the building blocks of AEGIS-256.

Steps:

Init(key, nonce)
data_blocks = Split(ZeroPad(data, 128), 128)
for di in data_blocks:
    Absorb(di)
tag = Finalize(|data|, tag_length_bits)
return tag

8.3. AEGISMAC-128X

AEGISMAC-128X is based on the building blocks of AEGIS-128X but replaces the Finalize function with a dedicated FinalizeMac function.

8.3.1. The Mac Function

Steps:

Init(key, nonce)
data_blocks = Split(ZeroPad(data, R), R)
for di in data_blocks:
    Absorb(di)
tag = FinalizeMac(|data|)
return tag

8.3.2. The FinalizeMac Function

FinalizeMac(data_len_bits)

The FinalizeMac function computes a 128- or 256-bit tag that authenticates the input data.

It finalizes all the instances, absorbs the resulting tags into the first state, and computes the final tag using that single state, as done in AEGIS-128L.

Steps:

t = {}
u = LE64(data_len_bits) || LE64(tag_length_bits)
for i in 0..D:
    t = t || (V[2,i] ^ u)

Repeat(7, Update(t, t))

tags = {}
if tag_length_bits == 128:
    for i in 0..D:   # tag from state 0 is included
        ti = V[0,i] ^ V[1,i] ^ V[2,i] ^ V[3,i] ^ V[4,i] ^ V[5,i] ^ V[6,i]
        tags = tags || ti

else:                # 256 bits
    for i in 1..D:   # tag from state 0 is skipped
        ti0 = V[0,i] ^ V[1,i] ^ V[2,i] ^ V[3,i]
        ti1 = V[4,i] ^ V[5,i] ^ V[6,i] ^ V[7,i]
        tags = tags || (ti0 || ti1)

if D > 1:
    # Absorb tags into state 0; other states are not used anymore
    for v in Split(tags, 256):
        Absorb(ZeroPad(v, R))

    u = LE64(D) || LE64(tag_length_bits)
    t = ZeroPad(V[2,0] ^ u, R)
    Repeat(7, Update(t, t))

if tag_length_bits == 128:
    tag = V[0,0] ^ V[1,0] ^ V[2,0] ^ V[3,0] ^ V[4,0] ^ V[5,0] ^ V[6,0]
else:                # 256 bits
    t0 = V[0,0] ^ V[1,0] ^ V[2,0] ^ V[3,0]
    t1 = V[4,0] ^ V[5,0] ^ V[6,0] ^ V[7,0]
    tag = t0 || t1

8.4. AEGISMAC-256X

AEGISMAC-256X is based on the building blocks of AEGIS-256X but replaces the Finalize function with a dedicated FinalizeMac function.

8.4.1. The Mac Function

Steps:

Init(key, nonce)
data_blocks = Split(ZeroPad(data, R), R)
for di in data_blocks:
    Absorb(di)
tag = FinalizeMac(|data|)
return tag

8.4.2. The FinalizeMac Function

FinalizeMac(data_len_bits)

The FinalizeMac function computes a 128- or 256-bit tag that authenticates the input data.

It finalizes all the instances, absorbs the resulting tags into the first state, and computes the final tag using that single state, as done in AEGIS-256.

t = {}
u = LE64(data_len_bits) || LE64(tag_length_bits)
for i in 0..D:
    t = t || (V[3,i] ^ u)

Repeat(7, Update(t))

tags = {}
if tag_length_bits == 128:
    for i in 1..D:   # tag from state 0 is skipped
        ti = V[0,i] ^ V[1,i] ^ V[2,i] ^ V[3,i] ^ V[4,i] ^ V[5,i]
        tags = tags || ti

else:                # 256 bits
    for i in 1..D:   # tag from state 0 is skipped
        ti0 = V[0,i] ^ V[1,i] ^ V[2,i]
        ti1 = V[3,i] ^ V[4,i] ^ V[5,i]
        tags = tags || (ti0 || ti1)

if D > 1:
    # Absorb tags into state 0; other states are not used anymore
    for v in Split(tags, 128):
        Absorb(ZeroPad(v, R))

    u = LE64(D) || LE64(tag_length_bits)
    t = ZeroPad(V[3,0] ^ u, R)
    Repeat(7, Update(t))

if tag_length_bits == 128:
    tag = V[0,0] ^ V[1,0] ^ V[2,0] ^ V[3,0] ^ V[4,0] ^ V[5,0] ^ V[6,0]
else:                # 256 bits
    t0 = V[0,0] ^ V[1,0] ^ V[2,0] ^ V[3,0]
    t1 = V[4,0] ^ V[5,0] ^ V[6,0] ^ V[7,0]
    tag = t0 || t1

9. Implementation Status

This note is to be removed before publishing as an RFC.

Multiple implementations of the schemes described in this document have been developed and verified for interoperability.

A comprehensive list of known implementations and integrations can be found at https://github.com/cfrg/draft-irtf-cfrg-aegis-aead, which includes reference implementations closely aligned with the pseudocode provided in this document.

10. Security Considerations

10.1. Usage Guidelines

10.1.1. Key and Nonce Selection

All AEGIS variants MUST be used in a nonce-respecting setting: for a given key, a nonce MUST only be used once, even with different tag lengths. Failure to do so would immediately reveal the bitwise difference between two messages.

Every key MUST be randomly chosen from a uniform distribution.

The nonce MAY be public or predictable. It can be a counter, the output of a permutation, or a generator with a long period.

With AEGIS-128L and AEGIS-128X, random nonces can safely encrypt up to 248 messages using the same key with negligible (~ 2-33, to align with NIST guidelines) collision probability.

With AEGIS-256 and AEGIS-256X, random nonces can be used with no practical limits.

10.1.2. Key Commitment

An authentication tag may verify under multiple keys, nonces, or associated data, but AEGIS is assumed to be key committing in the receiver-binding game, preventing common attacks when used with low-entropy keys such as passwords. Finding distinct keys and/or nonces that successfully verify the same (ad, ct, tag) tuple is expected to require ~264 attempts with a 128-bit authentication tag and ~2128 attempts with a 256-bit tag.

AEGIS is fully committing in the restricted setting where an adversary cannot control the associated data. As shown in [IR23], with the ability to alter the associated data, it is possible to efficiently find multiple keys that will verify the same authenticated ciphertext.

Protocols mandating a fully committing scheme without that restriction can provide the associated data as input to a cryptographic hash function and use the output as the ad parameter of the Encrypt and Decrypt functions. The selected hash function must ensure a minimum of 128-bit preimage resistance. An instance of such a function is SHA-256 [RFC6234].

Alternatively, the associated data can be fed into a collision-resistant KDF, such as HKDF [RFC5869], via the info input to derive the key parameter. The ad parameter can then be left empty. Note that the salt input MUST NOT be used since large salts get hashed, which affects commitment. Furthermore, this requires values concatenated to form the info input to be unambiguously encoded, like by appending their lengths.

10.1.3. Multi-User Security

AEGIS nonces match the size of the key. AEGIS-128L and AEGIS-128X feature 128-bit nonces, offering an extra 32 bits compared to the commonly used AEADs in IETF protocols. The AEGIS-256 and AEGIS-256X variants provide even larger nonces. With 192 random bits, 64 bits remain available to optionally encode additional information.

In all these variants, unused nonce bits can encode a key identifier, enhancing multi-user security. If every key has a unique identifier, multi-target attacks don’t provide any advantage over single-target attacks.

10.2. Implementation Security

If tag verification fails, the unverified plaintext and the computed message authentication tag MUST NOT be released. As shown in [VV18], even a partial leak of the plaintext without verification would facilitate chosen ciphertext attacks.

The security of AEGIS against timing and physical attacks is limited by the implementation of the underlying AESRound() function. Failure to implement AESRound() in a fashion safe against timing and physical attacks, such as differential power analysis, timing analysis, or fault injection attacks, may lead to leakage of secret key material or state information. The exact mitigations required for timing and physical attacks also depend on the threat model in question.

Regardless of the variant, the key and nonce are only required by the Init function; other functions only depend on the resulting state. Therefore, implementations can overwrite ephemeral keys with zeros right after the last Update call of the initialization function.

10.3. Security Guarantees

AEGIS-256 offers 256-bit message security against plaintext and state recovery, whereas AEGIS-128L offers 128-bit security.

Under the assumption that the secret key is unknown to the attacker, all AEGIS variants offer at least 128-bit security against forgery attacks.

Encrypting the same message with the same key and nonce but different associated data generates distinct ciphertexts that do not reveal any additional information about the message. However, (key, nonce) pairs MUST NOT be reused, even if the associated data differs.

AEGIS has been shown to have reforgeability resilience in [FLLW17]. Without the ability to set the associated data, a successful forgery does not increase the probability of subsequent forgeries.

AEGIS-128X and AEGIS-256X share the same security properties and requirements as AEGIS-128L and AEGIS-256 respectively. In particular, the security level and usage limits remain the same [D23].

AEGIS is considered secure against guess-and-determine attacks aimed at recovering the state from observed ciphertexts.

This resilience extends to quantum adversaries operating within the Q1 model, where the attacker has access to a quantum computer but is restricted to classical (non-quantum) communications with the systems under attack. In this model, quantum attacks offer no practical advantage in decrypting previously recorded ciphertexts or in recovering the encryption key.

This document extends the original specification by introducing optional support for 256-bit authentication tags, which are constructed similarly to the 128-bit tags. As shown in [SSI24], with 256-bit tags, all AEGIS variants achieve more than 128-bit security against forgery by differential attacks.

Security analyses of AEGIS can be found in [AEGIS], [M14], [FLLW17], [ENP19], [LIMS21], [JLD21], [STSI23], [IR23], [BS23], [AIKRS24], and [SSI24].

11. IANA Considerations

IANA has assigned the following identifiers in the AEAD Algorithms Registry:

Table 2: AEGIS entries in the AEAD Algorithms Registry
Algorithm Name ID
AEAD_AEGIS128L 32
AEAD_AEGIS256 33

IANA is requested to update the references of these entries to refer to the final version of this document.

IANA is also requested to register the following identifiers in the AEAD Algorithms Registry:

12. References

12.1. Normative References

[FIPS-AES]
NIST, "Advanced encryption standard (AES)", NIST Federal Information Processing Standards Publications 197, DOI 10.6028/NIST.FIPS.197, , <https://nvlpubs.nist.gov/nistpubs/FIPS/NIST.FIPS.197.pdf>.
[RFC2119]
Bradner, S., "Key words for use in RFCs to Indicate Requirement Levels", BCP 14, RFC 2119, DOI 10.17487/RFC2119, , <https://www.rfc-editor.org/rfc/rfc2119>.
[RFC5116]
McGrew, D., "An Interface and Algorithms for Authenticated Encryption", RFC 5116, DOI 10.17487/RFC5116, , <https://www.rfc-editor.org/rfc/rfc5116>.
[RFC5869]
Krawczyk, H. and P. Eronen, "HMAC-based Extract-and-Expand Key Derivation Function (HKDF)", RFC 5869, DOI 10.17487/RFC5869, , <https://www.rfc-editor.org/rfc/rfc5869>.
[RFC6234]
Eastlake 3rd, D. and T. Hansen, "US Secure Hash Algorithms (SHA and SHA-based HMAC and HKDF)", RFC 6234, DOI 10.17487/RFC6234, , <https://www.rfc-editor.org/rfc/rfc6234>.
[RFC8174]
Leiba, B., "Ambiguity of Uppercase vs Lowercase in RFC 2119 Key Words", BCP 14, RFC 8174, DOI 10.17487/RFC8174, , <https://www.rfc-editor.org/rfc/rfc8174>.

12.2. Informative References

[AEGIS]
Wu, H. and B. Preneel, "AEGIS: A Fast Authenticated Encryption Algorithm (v1.1)", , <https://competitions.cr.yp.to/round3/aegisv11.pdf>.
[AIKRS24]
Anand, R., Isobe, T., Kundu, A. K., Rahman, M., and S. Suryawanshi, "Differential fault attack on AES-based encryption schemes: application to B5G/6G ciphers—Rocca, Rocca-S and AEGIS", Journal of Cryptographic Engineering, 2024, DOI 10.1007/s13389-024-00360-6, , <https://doi.org/10.1007/s13389-024-00360-6>.
[BS23]
Bonnetain, X. and A. Schrottenloher, "Single-query Quantum Hidden Shift Attacks", Cryptology ePrint Archive, Paper 2023/1306, , <https://eprint.iacr.org/2023/1306>.
[D23]
Denis, F., "Adding more parallelism to the AEGIS authenticated encryption algorithms", Cryptology ePrint Archive, Paper 2023/523, , <https://eprint.iacr.org/2023/523>.
[ENP19]
Eichlseder, M., Nageler, M., and R. Primas, "Analyzing the Linear Keystream Biases in AEGIS", IACR Transactions on Symmetric Cryptology, 2019(4), pp. 348–368, DOI 10.13154/tosc.v2019.i4.348-368, , <https://doi.org/10.13154/tosc.v2019.i4.348-368>.
[FLLW17]
Forler, C., List, E., Lucks, S., and J. Wenzel, "Reforgeability of Authenticated Encryption Schemes", Cryptology ePrint Archive, Paper 2017/332, , <https://eprint.iacr.org/2017/332>.
[IR23]
Isobe, T. and M. Rahman, "Key Committing Security Analysis of AEGIS", Cryptology ePrint Archive, Paper 2023/1495, , <https://eprint.iacr.org/2023/1495>.
[JLD21]
Jiao, L., Li, Y., and S. Du, "Guess-and-Determine Attacks on AEGIS", The Computer Journal, vol 65, 2022(8), pp. 2221–2230, DOI 10.1093/comjnl/bxab059, , <https://doi.org/10.1093/comjnl/bxab059>.
[LGR21]
Len, J., Grubbs, P., and T. Ristenpart, "Partitioning Oracle Attacks", 30th USENIX Security Symposium (USENIX Security 21), pp. 195–212, , <https://www.usenix.org/conference/usenixsecurity21/presentation/len>.
[LIMS21]
Liu, F., Isobe, T., Meier, W., and K. Sakamoto, "Weak Keys in Reduced AEGIS and Tiaoxin", IACR Transactions on Symmetric Cryptology, 2021(2), pp. 104–139, DOI 10.46586/tosc.v2021.i2.104-139, , <https://doi.org/10.46586/tosc.v2021.i2.104-139>.
[M14]
Minaud, B., "Linear Biases in AEGIS Keystream", Selected Areas in Cryptography. SAC 2014. Lecture Notes in Computer Science, vol 8781, pp. 290–305, DOI 10.1007/978-3-319-13051-4_18, , <https://doi.org/10.1007/978-3-319-13051-4_18>.
[SSI24]
Shiraya, T., Sakamoto, K., and T. Isobe, "Bit-Wise Analysis for Forgery Attacks on AES-Based AEAD Schemes", Advances in Information and Computer Security. IWSEC 2024. Lecture Notes in Computer Science, vol 14977, DOI 10.1007/978-981-97-7737-2_1, , <https://doi.org/10.1007/978-981-97-7737-2_1>.
[STSI23]
Shiraya, T., Takeuchi, N., Sakamoto, K., and T. Isobe, "MILP-based security evaluation for AEGIS/Tiaoxin-346/Rocca", IET Information Security, vol 17, 2023(3), pp. 458-467, DOI 10.1049/ise2.12109, , <https://doi.org/10.1049/ise2.12109>.
[TEST-VECTORS]
"AEGIS Test Vectors", commit 398299b8, , <https://github.com/cfrg/draft-irtf-cfrg-aegis-aead/tree/398299b8/test-vectors>.
[VV18]
Vaudenay, S. and D. Vizár, "Can Caesar Beat Galois?", Applied Cryptography and Network Security. ACNS 2018. Lecture Notes in Computer Science, vol 10892, pp. 476–494, DOI 10.1007/978-3-319-93387-0_25, , <https://doi.org/10.1007/978-3-319-93387-0_25>.

Appendix A. Test Vectors

The following test vectors are also available in JSON format at [TEST-VECTORS]. In this format, byte strings are represented as JSON strings containing their hexadecimal encoding.

A.1. AESRound Test Vector

in   : 000102030405060708090a0b0c0d0e0f

rk   : 101112131415161718191a1b1c1d1e1f

out  : 7a7b4e5638782546a8c0477a3b813f43

A.2. AEGIS-128L Test Vectors

A.2.1. Update Test Vector

S0   : 9b7e60b24cc873ea894ecc07911049a3
S1   : 330be08f35300faa2ebf9a7b0d274658
S2   : 7bbd5bd2b049f7b9b515cf26fbe7756c
S3   : c35a00f55ea86c3886ec5e928f87db18
S4   : 9ebccafce87cab446396c4334592c91f
S5   : 58d83e31f256371e60fc6bb257114601
S6   : 1639b56ea322c88568a176585bc915de
S7   : 640818ffb57dc0fbc2e72ae93457e39a

M0   : 033e6975b94816879e42917650955aa0
M1   : fcc1968a46b7e97861bd6e89af6aa55f

After Update:
S0   : 596ab773e4433ca0127c73f60536769d
S1   : 790394041a3d26ab697bde865014652d
S2   : 38cf49e4b65248acd533041b64dd0611
S3   : 16d8e58748f437bfff1797f780337cee
S4   : 9689ecdf08228c74d7e3360cca53d0a5
S5   : a21746bb193a569e331e1aa985d0d729
S6   : 09d714e6fcf9177a8ed1cde7e3d259a6
S7   : 61279ba73167f0ab76f0a11bf203bdff

A.2.2. Test Vector 1

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    :

msg   : 00000000000000000000000000000000

ct    : c1c0e58bd913006feba00f4b3cc3594e

tag128: abe0ece80c24868a226a35d16bdae37a

tag256: 25835bfbb21632176cf03840687cb968
        cace4617af1bd0f7d064c639a5c79ee4

A.2.3. Test Vector 2

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    :

msg   :

ct    :

tag128: c2b879a67def9d74e6c14f708bbcc9b4

tag256: 1360dc9db8ae42455f6e5b6a9d488ea4
        f2184c4e12120249335c4ee84bafe25d

A.2.4. Test Vector 3

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    : 0001020304050607

msg   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

ct    : 79d94593d8c2119d7e8fd9b8fc77845c
        5c077a05b2528b6ac54b563aed8efe84

tag128: cc6f3372f6aa1bb82388d695c3962d9a

tag256: 022cb796fe7e0ae1197525ff67e30948
        4cfbab6528ddef89f17d74ef8ecd82b3

A.2.5. Test Vector 4

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    : 0001020304050607

msg   : 000102030405060708090a0b0c0d

ct    : 79d94593d8c2119d7e8fd9b8fc77

tag128: 5c04b3dba849b2701effbe32c7f0fab7

tag256: 86f1b80bfb463aba711d15405d094baf
        4a55a15dbfec81a76f35ed0b9c8b04ac

A.2.6. Test Vector 5

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f
        20212223242526272829

msg   : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f
        3031323334353637

ct    : b31052ad1cca4e291abcf2df3502e6bd
        b1bfd6db36798be3607b1f94d34478aa
        7ede7f7a990fec10

tag128: 7542a745733014f9474417b337399507

tag256: b91e2947a33da8bee89b6794e647baf0
        fc835ff574aca3fc27c33be0db2aff98

A.2.7. Test Vector 6

This test MUST return a “verification failed” error.

key   : 10000200000000000000000000000000

nonce : 10010000000000000000000000000000

ad    : 0001020304050607

ct    : 79d94593d8c2119d7e8fd9b8fc77

tag128: 5c04b3dba849b2701effbe32c7f0fab7

tag256: 86f1b80bfb463aba711d15405d094baf
        4a55a15dbfec81a76f35ed0b9c8b04ac

A.2.8. Test Vector 7

This test MUST return a “verification failed” error.

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    : 0001020304050607

ct    : 79d94593d8c2119d7e8fd9b8fc78

tag128: 5c04b3dba849b2701effbe32c7f0fab7

tag256: 86f1b80bfb463aba711d15405d094baf
        4a55a15dbfec81a76f35ed0b9c8b04ac

A.2.9. Test Vector 8

This test MUST return a “verification failed” error.

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    : 0001020304050608

ct    : 79d94593d8c2119d7e8fd9b8fc77

tag128: 5c04b3dba849b2701effbe32c7f0fab7

tag256: 86f1b80bfb463aba711d15405d094baf
        4a55a15dbfec81a76f35ed0b9c8b04ac

A.2.10. Test Vector 9

This test MUST return a “verification failed” error.

key   : 10010000000000000000000000000000

nonce : 10000200000000000000000000000000

ad    : 0001020304050607

ct    : 79d94593d8c2119d7e8fd9b8fc77

tag128: 6c04b3dba849b2701effbe32c7f0fab8

tag256: 86f1b80bfb463aba711d15405d094baf
        4a55a15dbfec81a76f35ed0b9c8b04ad

A.3. AEGIS-256 Test Vectors

A.3.1. Update Test Vector

S0   : 1fa1207ed76c86f2c4bb40e8b395b43e
S1   : b44c375e6c1e1978db64bcd12e9e332f
S2   : 0dab84bfa9f0226432ff630f233d4e5b
S3   : d7ef65c9b93e8ee60c75161407b066e7
S4   : a760bb3da073fbd92bdc24734b1f56fb
S5   : a828a18d6a964497ac6e7e53c5f55c73

M    : b165617ed04ab738afb2612c6d18a1ec

After Update:
S0   : e6bc643bae82dfa3d991b1b323839dcd
S1   : 648578232ba0f2f0a3677f617dc052c3
S2   : ea788e0e572044a46059212dd007a789
S3   : 2f1498ae19b80da13fba698f088a8590
S4   : a54c2ee95e8c2a2c3dae2ec743ae6b86
S5   : a3240fceb68e32d5d114df1b5363ab67

A.3.2. Test Vector 1

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    :

msg   : 00000000000000000000000000000000

ct    : 754fc3d8c973246dcc6d741412a4b236

tag128: 3fe91994768b332ed7f570a19ec5896e

tag256: 1181a1d18091082bf0266f66297d167d
        2e68b845f61a3b0527d31fc7b7b89f13

A.3.3. Test Vector 2

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    :

msg   :

ct    :

tag128: e3def978a0f054afd1e761d7553afba3

tag256: 6a348c930adbd654896e1666aad67de9
        89ea75ebaa2b82fb588977b1ffec864a

A.3.4. Test Vector 3

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    : 0001020304050607

msg   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

ct    : f373079ed84b2709faee373584585d60
        accd191db310ef5d8b11833df9dec711

tag128: 8d86f91ee606e9ff26a01b64ccbdd91d

tag256: b7d28d0c3c0ebd409fd22b4416050307
        3a547412da0854bfb9723020dab8da1a

A.3.5. Test Vector 4

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    : 0001020304050607

msg   : 000102030405060708090a0b0c0d

ct    : f373079ed84b2709faee37358458

tag128: c60b9c2d33ceb058f96e6dd03c215652

tag256: 8c1cc703c81281bee3f6d9966e14948b
        4a175b2efbdc31e61a98b4465235c2d9

A.3.6. Test Vector 5

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f
        20212223242526272829

msg   : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f
        3031323334353637

ct    : 57754a7d09963e7c787583a2e7b859bb
        24fa1e04d49fd550b2511a358e3bca25
        2a9b1b8b30cc4a67

tag128: ab8a7d53fd0e98d727accca94925e128

tag256: a3aca270c006094d71c20e6910b5161c
        0826df233d08919a566ec2c05990f734

A.3.7. Test Vector 6

This test MUST return a “verification failed” error.

key   : 10000200000000000000000000000000
        00000000000000000000000000000000

nonce : 10010000000000000000000000000000
        00000000000000000000000000000000

ad    : 0001020304050607

ct    : f373079ed84b2709faee37358458

tag128: c60b9c2d33ceb058f96e6dd03c215652

tag256: 8c1cc703c81281bee3f6d9966e14948b
        4a175b2efbdc31e61a98b4465235c2d9

A.3.8. Test Vector 7

This test MUST return a “verification failed” error.

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    : 0001020304050607

ct    : f373079ed84b2709faee37358459

tag128: c60b9c2d33ceb058f96e6dd03c215652

tag256: 8c1cc703c81281bee3f6d9966e14948b
        4a175b2efbdc31e61a98b4465235c2d9

A.3.9. Test Vector 8

This test MUST return a “verification failed” error.

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    : 0001020304050608

ct    : f373079ed84b2709faee37358458

tag128: c60b9c2d33ceb058f96e6dd03c215652

tag256: 8c1cc703c81281bee3f6d9966e14948b
        4a175b2efbdc31e61a98b4465235c2d9

A.3.10. Test Vector 9

This test MUST return a “verification failed” error.

key   : 10010000000000000000000000000000
        00000000000000000000000000000000

nonce : 10000200000000000000000000000000
        00000000000000000000000000000000

ad    : 0001020304050607

ct    : f373079ed84b2709faee37358458

tag128: c60b9c2d33ceb058f96e6dd03c215653

tag256: 8c1cc703c81281bee3f6d9966e14948b
        4a175b2efbdc31e61a98b4465235c2da

A.4. AEGIS-128X2 Test Vectors

A.4.1. Initial State

key   : 000102030405060708090a0b0c0d0e0f

nonce : 101112131415161718191a1b1c1d1e1f

ctx[0]: 00010000000000000000000000000000
ctx[1]: 01010000000000000000000000000000

After initialization:

V[0,0]: a4fc1ad9a72942fb88bd2cabbba6509a
V[0,1]: 80a40e392fc71084209b6c3319bdc6cc

V[1,0]: 380f435cf801763b1f0c2a2f7212052d
V[1,1]: 73796607b59b1b650ee91c152af1f18a

V[2,0]: 6ee1de433ea877fa33bc0782abff2dcb
V[2,1]: b9fab2ab496e16d1facaffd5453cbf14

V[3,0]: 85f94b0d4263bfa86fdf45a603d8b6ac
V[3,1]: 90356c8cadbaa2c969001da02e3feca0

V[4,0]: 09bd69ad3730174bcd2ce9a27cd1357e
V[4,1]: e610b45125796a4fcf1708cef5c4f718

V[5,0]: fcdeb0cf0a87bf442fc82383ddb0f6d6
V[5,1]: 61ad32a4694d6f3cca313a2d3f4687aa

V[6,0]: 571c207988659e2cdfbdaae77f4f37e3
V[6,1]: 32e6094e217573bf91fb28c145a3efa8

V[7,0]: ca549badf8faa58222412478598651cf
V[7,1]: 3407279a54ce76d2e2e8a90ec5d108eb

A.4.2. Test Vector 1

key   : 000102030405060708090a0b0c0d0e0f

nonce : 101112131415161718191a1b1c1d1e1f

ad    :

msg   :

ct    :

tag128: 63117dc57756e402819a82e13eca8379

tag256: b92c71fdbd358b8a4de70b27631ace90
        cffd9b9cfba82028412bac41b4f53759

A.4.3. Test Vector 2

key   : 000102030405060708090a0b0c0d0e0f

nonce : 101112131415161718191a1b1c1d1e1f

ad    : 0102030401020304

msg   : 04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        0405060704050607

ct    : 5795544301997f93621b278809d6331b
        3bfa6f18e90db12c4aa35965b5e98c5f
        c6fb4e54bcb6111842c20637252eff74
        7cb3a8f85b37de80919a589fe0f24872
        bc926360696739e05520647e390989e1
        eb5fd42f99678a0276a498f8c454761c
        9d6aacb647ad56be62b29c22cd4b5761
        b38f43d5a5ee062f

tag128: 1aebc200804f405cab637f2adebb6d77

tag256: c471876f9b4978c44f2ae1ce770cdb11
        a094ee3feca64e7afcd48bfe52c60eca

A.5. AEGIS-128X4 Test Vectors

A.5.1. Initial State

key   : 000102030405060708090a0b0c0d0e0f

nonce : 101112131415161718191a1b1c1d1e1f

ctx[0]: 00030000000000000000000000000000
ctx[1]: 01030000000000000000000000000000
ctx[2]: 02030000000000000000000000000000
ctx[3]: 03030000000000000000000000000000

After initialization:

V[0,0]: 924eb07635003a37e6c6575ba8ce1929
V[0,1]: c8b6a5d91475445e936d48e794be0ce2
V[0,2]: fcd37d050e24084befe3bbb219d64760
V[0,3]: 2e9f58cfb893a8800220242c373a8b18

V[1,0]: 1a1f60c4fab64e5471dc72edfcf6fe6b
V[1,1]: c1e525ebea2d6375a9edd045dce96381
V[1,2]: 97a3e25abd228a44d4a14a6d3fe9185c
V[1,3]: c2d4cf7f4287a98744645674265d4ca8

V[2,0]: 7bb50c534f6ec4780530ff1cce8a16e8
V[2,1]: 7b08d57557da0b5ef7b5f7d98b0ba189
V[2,2]: 6bfcac34ddb68404821a4d665303cb0f
V[2,3]: d95626f6dfad1aed7467622c38529932

V[3,0]: af339fd2d50ee45fc47665c647cf6586
V[3,1]: d0669b39d140f0e118a4a511efe2f95a
V[3,2]: 7a94330f35c194fadda2a87e42cdeccc
V[3,3]: 233b640d1f4d56e2757e72c1a9d8ecb1

V[4,0]: 9f93737d699ba05c11e94f2b201bef5e
V[4,1]: 61caf387cf7cfd3f8300ac7680ccfd76
V[4,2]: 5825a671ecef03b7a9c98a601ae32115
V[4,3]: 87a1fe4d558161a8f4c38731f3223032

V[5,0]: 7a5aca78d636c05bbc702b2980196ab6
V[5,1]: 915d868408495d07eb527789f282c575
V[5,2]: d0947bfbc1d3309cdffc9be1503aea62
V[5,3]: 8834ea57a15b9fbdc0245464a4b8cbef

V[6,0]: e46f4cf71a95ac45b6f0823e3aba1a86
V[6,1]: 8c4ecef682fc44a8eba911b3fc7d99f9
V[6,2]: a4fb61e2c928a2ca760b8772f2ea5f2e
V[6,3]: 3d34ea89da73caa3016c280500a155a3

V[7,0]: 85075f0080e9d618e7eb40f57c32d9f7
V[7,1]: d2ab2b320c6e93b155a3787cb83e5281
V[7,2]: 0b3af0250ae36831a1b072e499929bcb
V[7,3]: 5cce4d00329d69f1aae36aa541347512

A.5.2. Test Vector 1

key   : 000102030405060708090a0b0c0d0e0f

nonce : 101112131415161718191a1b1c1d1e1f

ad    :

msg   :

ct    :

tag128: 5bef762d0947c00455b97bb3af30dfa3

tag256: a4b25437f4be93cfa856a2f27e4416b4
        2cac79fd4698f2cdbe6af25673e10a68

A.5.3. Test Vector 2

key   : 000102030405060708090a0b0c0d0e0f

nonce : 101112131415161718191a1b1c1d1e1f

ad    : 0102030401020304

msg   : 04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        0405060704050607

ct    : e836118562f4479c9d35c17356a83311
        4c21f9aa39e4dda5e5c87f4152a00fce
        9a7c38f832eafe8b1c12f8a7cf12a81a
        1ad8a9c24ba9dedfbdaa586ffea67ddc
        801ea97d9ab4a872f42d0e352e2713da
        cd609f9442c17517c5a29daf3e2a3fac
        4ff6b1380c4e46df7b086af6ce6bc1ed
        594b8dd64aed2a7e

tag128: 0e56ab94e2e85db80f9d54010caabfb4

tag256: 69abf0f64a137dd6e122478d777e98bc
        422823006cf57f5ee822dd78397230b2

A.6. AEGIS-256X2 Test Vectors

A.6.1. Initial State

key   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

nonce : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f

ctx[0]: 00010000000000000000000000000000
ctx[1]: 01010000000000000000000000000000

After initialization:

V[0,0]: eca2bf4538442e8712d4972595744039
V[0,1]: 201405efa9264f07911db58101903087

V[1,0]: 3e536a998799408a97f3479a6f779d48
V[1,1]: 0d79a7d822a5d215f78c3bf2feb33ae1

V[2,0]: cf8c63d6f2b4563cdd9231107c85950e
V[2,1]: 78d17ed7d8d563ff11bd202c76864839

V[3,0]: d7e0707e6bfbbad913bc94b6993a9fa0
V[3,1]: 097e4b1bff40d4c19cb29dfd125d62f2

V[4,0]: a373cf6d537dd66bc0ef0f2f9285359f
V[4,1]: c0d0ae0c48f9df3faaf0e7be7768c326

V[5,0]: 9f76560dcae1efacabdcce446ae283bc
V[5,1]: bd52a6b9c8f976a26ec1409df19e8bfe

A.6.2. Test Vector 1

key   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

nonce : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f

ad    :

msg   :

ct    :

tag128: 62cdbab084c83dacdb945bb446f049c8

tag256: 25d7e799b49a80354c3f881ac2f1027f
        471a5d293052bd9997abd3ae84014bb7

A.6.3. Test Vector 2

key   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

nonce : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f

ad    : 0102030401020304

msg   : 04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        0405060704050607

ct    : 73110d21a920608fd77b580f1e442808
        7a7365cb153b4eeca6b62e1a70f7f9a8
        d1f31f17da4c3acfacb2517f2f5e1575
        8c35532e33751a964d18d29a599d2dc0
        7f9378339b9d8c9fa03d30a4d7837cc8
        eb8b99bcbba2d11cd1a0f994af2b8f94
        7ef18473bd519e5283736758480abc99
        0e79d4ccab93dde9

tag128: 94a3bd44ad3381e36335014620ee638e

tag256: 0392c62b17ddb00c172a010b5a327d0f
        97317b6fbaee31ef741f004d7adc1e81

A.7. AEGIS-256X4 Test Vectors

A.7.1. Initial State

key   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

nonce : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f

ctx[0]: 00030000000000000000000000000000
ctx[1]: 01030000000000000000000000000000
ctx[2]: 02030000000000000000000000000000
ctx[3]: 03030000000000000000000000000000

After initialization:

V[0,0]: 482a86e8436cd2361063a4b2702769b9
V[0,1]: d95a2be81c9245b22996f68eea0122f9
V[0,2]: 0c2a3b348b1a5e256c6751377318c41e
V[0,3]: f64436a21653fe7cf2e0829a177db383

V[1,0]: e705e8866267717d96092e58e78b574c
V[1,1]: d1dd412142df9806cc267af2fe1d830e
V[1,2]: 30e7dfd3c9941b8394e95bdf5bac99d9
V[1,3]: 9f27186f8a4fab86820689822c3c74d2

V[2,0]: e1aa6af5d9e31dde8d94a48a0810fa89
V[2,1]: 63555cdf0d98f18fb75b029ad80786c0
V[2,2]: a3ee0e4a3429a9539e4fcec385475608
V[2,3]: 28ea527d31ef61df498dc107fe02df99

V[3,0]: 37f06808410c8f3954525ae44584d3be
V[3,1]: 8fcc23bca2fe2209f93d34e2da35b33d
V[3,2]: 33156347df89eaa69ab11096362daccf
V[3,3]: bbe58d9dbe8c5b0469be5a87086db5d4

V[4,0]: d1c9eb37fecbc5ada7b351fa4f501f32
V[4,1]: 0b9b803283c1538628b507c8f6432434
V[4,2]: bfb8b6d4f87cce28825c7e92f54b8728
V[4,3]: 8917bb5b09c32f900c6a5a1d63c46264

V[5,0]: 4f6110c2ef0c3c687e90c1e5532ddf8e
V[5,1]: 031bd85d99f64684d23728a0453c72a1
V[5,2]: 10bc7ec34d4119b5bdeb6c7dfc458247
V[5,3]: 591ece530aeaa5c9867220156f5c25e3

A.7.2. Test Vector 1

key   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

nonce : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f

ad    :

msg   :

ct    :

tag128: 3b7fee6cee7bf17888ad11ed2397beb4

tag256: 6093a1a8aab20ec635dc1ca71745b01b
        5bec4fc444c9ffbebd710d4a34d20eaf

A.7.3. Test Vector 2

key   : 000102030405060708090a0b0c0d0e0f
        101112131415161718191a1b1c1d1e1f

nonce : 101112131415161718191a1b1c1d1e1f
        202122232425262728292a2b2c2d2e2f

ad    : 0102030401020304

msg   : 04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        04050607040506070405060704050607
        0405060704050607

ct    : bec109547f8316d598b3b7d947ad4c0e
        f5b98e217cffa0d858ad49ae34109a95
        abc5b5fada820c4d6ae2fca0f5e2444e
        52a04a1edb7bec71408de3e199500521
        94506be3ba6a4de51a15a577ea0e4c14
        f7539a13e751a555f48d0f49fecffb22
        0525e60d381e2efa803b09b7164ba59f
        dc66656affd51e06

tag128: ec44b512d713f745547be345bcc66b6c

tag256: ba3168ecd7f7120c5e204a7e0d616e39
        5675ddfe00e4e5490a5ba93bb1a70555

A.8. AEGISMAC Test Vectors

A.8.1. AEGISMAC-128L Test Vector

key    : 10010000000000000000000000000000

nonce  : 10000200000000000000000000000000

data   : 000102030405060708090a0b0c0d0e0f
         101112131415161718191a1b1c1d1e1f
         202122

tag128 : d3f09b2842ad301687d6902c921d7818

tag256 : 9490e7c89d420c9f37417fa625eb38e8
         cad53c5cbec55285e8499ea48377f2a3

A.8.2. AEGISMAC-128X2 Test Vector

key    : 10010000000000000000000000000000

nonce  : 10000200000000000000000000000000

data   : 000102030405060708090a0b0c0d0e0f
         101112131415161718191a1b1c1d1e1f
         202122

tags128: 9f5f69928fa481fa86e8a51e072a9b29
         eeaa77a356f796b427f6a54f52ae0e20

tag128 : 7aa41edfd57a95c1108d83c63b8d4d01

tags256: 22cdcf558d0338b6ad8fbba4da7307d3
         0bd685fff23dc9d41f598c2a7ea44055

tag256 : 55b6449929cd2b01d04786e57698b3dd
         fb5cbf6e421bbd022637a33d60f40294

A.8.3. AEGISMAC-128X4 Test Vector

key    : 10010000000000000000000000000000

nonce  : 10000200000000000000000000000000

data   : 000102030405060708090a0b0c0d0e0f
         101112131415161718191a1b1c1d1e1f
         202122

tags128: 7fecd913a7cb0011b6c4c88e0c6f8578
         19a98fbeaf21d1092c32953fff82c8a9
         c7b5e6625a5765d04af26cf22adc1282
         4c8cf3b4dbb85f379e13b04a8d06bca7

tag128 : 46a194ea4337bb32c2186a99e312f3a7

tags256: d595732bdf230a1441978414cd8cfa39
         ecef6ad0ee1e65ae530006ca5d5f4481
         f9ec5edfa64e9c3d76d3a5eda9fe5bd1
         fb9d842373f7c90bedb8bfe383740b23
         1264a15143eb8c3d9f17754099f147e3
         401c83c0d5afc70fd0d68bfd17f9280f

tag256 : ea884072699569532fb68ae9fb2653c9
         ffef3e974333d3a17d77be02453cc12f

A.8.4. AEGISMAC-256 Test Vector

key    : 10010000000000000000000000000000
         00000000000000000000000000000000

nonce  : 10000200000000000000000000000000
         00000000000000000000000000000000

data   : 000102030405060708090a0b0c0d0e0f
         101112131415161718191a1b1c1d1e1f
         202122

tag128 : c08e20cfc56f27195a46c9cef5c162d4

tag256 : a5c906ede3d69545c11e20afa360b221
         f936e946ed2dba3d7c75ad6dc2784126

A.8.5. AEGISMAC-256X2 Test Vector

key    : 10010000000000000000000000000000
         00000000000000000000000000000000

nonce  : 10000200000000000000000000000000
         00000000000000000000000000000000

data   : 000102030405060708090a0b0c0d0e0f
         101112131415161718191a1b1c1d1e1f
         202122

tags128: db8852ea2c03f22b0d0694ea4e88e4b1

tag128 : fb319cb6dd728a764606fb14d37f2a5e

tags256: b4d124976b34b2aa8bc3fa0b55396cf7
         fb83f4ef5ba607681cddf5ba3e925727

tag256 : 0844b20ed5147ceae89c7a160263afd4
         b1382d6b154ecf560ce8a342cb6a8fd1

A.8.6. AEGISMAC-256X4 Test Vector

key    : 10010000000000000000000000000000
         00000000000000000000000000000000

nonce  : 10000200000000000000000000000000
         00000000000000000000000000000000

data   : 000102030405060708090a0b0c0d0e0f
         101112131415161718191a1b1c1d1e1f
         202122

tags128: 702d595e74962d073a0d68c883d80deb
         41ab207e43b16659d556d7467218a9ec
         113406e7cb56e0f6b63c95c88421dfee

tag128 : a51f9bc5beae60cce77f0dbc60761edd

tags256: a46ebcd10939b42012a3f9b6147172af
         3b74aec5d0070e8d6a81498ccbcdb41a
         d57cd7a50fa8621dfea2e81cd941def5
         57094251a24527a4d97fc4c825368180
         3973129d07cc20811a8b3c34574f6ce0
         10165dd0e856e797f70731e78e32f764

tag256 : b36a16ef07c36d75a91f437502f24f54
         5b8dfa88648ed116943c29fead3bf10c

Acknowledgments

The AEGIS authenticated encryption algorithm was invented by Hongjun Wu and Bart Preneel.

The state update function leverages the AES permutation invented by Joan Daemen and Vincent Rijmen. They also authored the Pelican MAC, which partly motivated the design of the AEGIS MAC.

We would like to thank the following individuals for their contributions:

Authors' Addresses

Frank Denis
Fastly Inc.
Samuel Lucas
Individual Contributor