Network Working Group Y. Nakano
InternetDraft K. Fukushima
Intended status: Informational KDDI Research, Inc.
Expires: 27 July 2024 T. Isobe
University of Hyogo
24 January 2024
Encryption algorithm RoccaS
draftnakanoroccas05
Abstract
This document defines RoccaS encryption scheme, which is an
Authenticated Encryption with Associated Data (AEAD), using a 256bit
key and can be efficiently implemented utilizing the AES New
Instruction set (AESNI).
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Table of Contents
1. Introduction . . . . . . . . . . . . . . . . . . . . . . . . 2
1.1. Background . . . . . . . . . . . . . . . . . . . . . . . 2
1.2. Design Concept . . . . . . . . . . . . . . . . . . . . . 4
1.3. Conventions Used in This Document . . . . . . . . . . . . 4
2. Algorithm Description . . . . . . . . . . . . . . . . . . . . 5
2.1. Notations . . . . . . . . . . . . . . . . . . . . . . . . 5
2.2. The Round Function . . . . . . . . . . . . . . . . . . . 6
2.3. Specification . . . . . . . . . . . . . . . . . . . . . . 7
2.3.1. Initialization . . . . . . . . . . . . . . . . . . . 7
2.3.2. Processing the Associated Data . . . . . . . . . . . 7
2.3.3. Encryption . . . . . . . . . . . . . . . . . . . . . 8
2.3.4. Finalization . . . . . . . . . . . . . . . . . . . . 8
2.3.5. RoccaS Algorithm . . . . . . . . . . . . . . . . . . 8
2.3.6. A Raw Encryption Scheme . . . . . . . . . . . . . . . 11
2.3.7. A Keystream Generation Scheme . . . . . . . . . . . . 12
2.3.8. Support for Shorter Key Length . . . . . . . . . . . 12
2.3.9. Settings as AEAD Algorithm Specifications . . . . . . 12
2.4. Security Claims . . . . . . . . . . . . . . . . . . . . . 13
2.4.1. Classic Setting . . . . . . . . . . . . . . . . . . . 13
2.4.2. Quantum Setting . . . . . . . . . . . . . . . . . . . 13
3. Security Considerations . . . . . . . . . . . . . . . . . . . 13
3.1. Security Against Attacks . . . . . . . . . . . . . . . . 13
3.2. Other Attacks . . . . . . . . . . . . . . . . . . . . . . 14
3.3. Nonce Reuse . . . . . . . . . . . . . . . . . . . . . . . 14
3.4. Tag Verificatoin Failure . . . . . . . . . . . . . . . . 14
4. IANA Considerations . . . . . . . . . . . . . . . . . . . . . 14
5. References . . . . . . . . . . . . . . . . . . . . . . . . . 14
5.1. Normative References . . . . . . . . . . . . . . . . . . 14
5.2. Informative References . . . . . . . . . . . . . . . . . 15
Appendix A. Software Implementation . . . . . . . . . . . . . . 16
A.1. Implementation with SIMD Instructions . . . . . . . . . . 16
A.2. Test Vector . . . . . . . . . . . . . . . . . . . . . . . 22
Acknowledgements . . . . . . . . . . . . . . . . . . . . . . . . 25
Authors' Addresses . . . . . . . . . . . . . . . . . . . . . . . 25
1. Introduction
1.1. Background
Countries such as the USA, China, and South Korea are adapting to the
fifthgeneration mobile communication systems (5G) technology at an
increasingly rapid pace. There are more than 1500 cities worldwide
with access to 5G technology. Other countries are also taking
significant steps to make 5G networks commercially available to their
citizens. As the research in 5G technology is moving toward global
standardization, it is important for the research community to focus
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on developing solutions beyond 5G and for the 6G era. The first
white paper on 6G [WP6G] was published by 6G Flagship, University of
Oulu, Finland under the 6Genesis project in 2019. This white paper
identified the key drivers, research requirements, challenges, and
essential research questions related to 6G. One of the main
requirements as listed in this paper was to look at the problem of
transmitting data at a speed of over 100 Gbps per user.
Additionally, 3GPP requires that the cryptographic algorithms
proposed for 5G systems should support 256bit keys [SPEC5G]. Apart
from the need of speeds of more than 100 Gbps and supporting 256bit
keys, 3GPP also discusses the possible impacts of quantum computing
in the coming years, especially due to Grover's algorithm. While
describing the impact of quantum computers on symmetric algorithms
required for 5G and beyond, 3GPP states the following in Section 5.3
of [SPEC5G]:
"The threat to symmetric cryptography from quantum computing is lower
than that for asymmetric cryptography. As such there is little
benefit in transitioning symmetric algorithms without corresponding
changes to the asymmetric algorithms that accompany them."
However, it has been shown in numerous articles that quantum
computers can be used to either efficiently break or drastically
reduce the time necessary to attack some symmetrickey cryptography
methods. These results require a serious reevaluation of the premise
that has informed beyond 5G quantum security concerns up to this
point. Additionally, since NIST will finally standardize quantum
resistant public key algorithms in the coming few years, we believe
it is important for the research community to also focus on symmetric
algorithms for future telecommunications that would provide security
against quantum adversaries. The effectiveness of postquantum
asymmetric cryptography would only be improved if the symmetric
cryptography used with it is also quantum resistant. Thus, a
symmetric cryptographic algorithm that
* supports 256bit key and provides 256bit security with respect to
key recovery and forgery attacks,
* has an encryption/decryption speed of more than 100 Gbps, and
* is at least as secure as AES256 against quantum adversaries (for
128bit security against a quantum adversary)
is needed.
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RoccaS has been designed as an encryption algorithm for a high speed
communication such as future internet and beyond 5G mobile
communications. RoccaS achieves an encryption/decryption speed of
more than 200 Gbps in both the raw encryption scheme and the AEAD
scheme on an Intel(R) Core(TM) i912900K. It can provide 256bit and
128bit security against key recovery attacks in classical and
quantum adversaries respectively. The high throughput of RoccaS can
be achieved by utilizing the AESNI [AESNI]. A similar approach has
been taken by the AEGIS family [AEGIS] and Tiaoxin346 [TIAOXIN],
both two submissions to the CAESAR competition [CAESAR]. SNOWV
[SNOWV] also uses the AES round function as a component so AESNI
can be used.
1.2. Design Concept
In this document, we present an AESbased AEAD encryption scheme with
a 256bit key and 256bit tag called RoccaS.
To achieve such a dramatically fast encryption/decryption speed,
RoccaS adopts the design principle such as the SIMDfriendly round
function and an efficient permutationbased structure. We explore
the class of AESbased structures to further increase its speed and
reduce the state size. Specifically, we take the following different
approaches:
* To minimize the critical path of the round function, we focus on
the structure where each 128bit block of the internal state is
updated by either one AES round (aesenc) or XOR while Jean and
Nikolic consider the case of applying both aesenc and XOR in a
cascade way for one round.
* We introduce a permutation between the 128bit state words of the
internal state in order to increase the number of possible
candidates while maintaining efficiency because executing such a
permutation is a costfree operation in the target software, which
was not taken into account in [DESIGN].
1.3. Conventions Used in This Document
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.
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2. Algorithm Description
In this section, the notations and the specification of our designs
will be described.
2.1. Notations
The following notations will be used in the document. Throughout
this document, a block means a 2octet value. For the constants Z0
and Z1, we utilize the same ones as Tiaoxin346 [TIAOXIN].
1. X ^ Y: The bitwise Exclusive OR (XOR) of X and Y.
2. X#Y: For a number X and a positive integer Y, the Yth power of
X.
3. f#(N): For a function f and a nonnegative integer N, the Nth
iteration of function f.
4. X: The length of X in bits.
5. XY : The concatenation of X and Y.
6. ZERO(l): A zero string of length l bits.
7. PAD(X): XZERO(l), where l is the minimal nonnegative integer
such that PAD(X) is a multiple of 256.
8. PADN(X): XZERO(l), where l is the minimal nonnegative integer
such that PADN(X) is a multiple of 128.
9. LE128(X): the littleendian encoding of 128bit integer X.
10. Write X as X = X[0]X[1] ... X[n] with X[i] = 256, where
n is X/256  1. In addition, X[i] is written as X[i] =
X[i]_0X[i]_1 where X[i]_0 and X[i]_1 are 128bit.
11. S: The state of RoccaS, which is composed of 7 blocks, i.e., S
= (S[0], S[1], ..., S[6]), where S[i] (0 <= i <= 6) are blocks
and S[0] is the first block.
12. Z0: A 128bit constant block defined as Z0 =
428a2f98d728ae227137449123ef65cd.
13. Z1: A 128bit constant block defined as Z1 =
b5c0fbcfec4d3b2fe9b5dba58189dbbc.
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14. A(X): The AES round function without the constant addition
operation, as defined below:
A(X) = MixColumns( ShiftRows( SubBytes(X) ) ), where MixColumns,
ShiftRows and SubBytes are the same operations as defined in AES
[AES].
15. AES(X,Y): One AES round is applied to the block X, where the
round constant is Y, as defined below:
AES(X,Y) = A(X) ^ Y.
This operation is the same as aesenc, which is one of the
instructions of AESNI and performs one regular (not the last)
round of AES on an input state X with a subkey Y.
16. R(S,X0,X1): The round function is used to update the state S, as
defined in Section 2.2.
2.2. The Round Function
The input of the round function R(S,X0,X1) of RoccaS consists of the
state S and two blocks (X0,X1). If denoting the output by Snew,
Snew:=R(S,X0,X1) can be defined as follows:
Snew[0] = S[6] ^ S[1],
Snew[1] = AES(S[0],X_0),
Snew[2] = AES(S[1],S[0]),
Snew[3] = AES(S[2],S[6]),
Snew[4] = AES(S[3],X_1),
Snew[5] = AES(S[4],S[3]),
Snew[6] = AES(S[5],S[4]).
The corresponding illustration can be found in Figure 1.
++ ++ ++ ++ ++ ++ ++
S[0] S[1] S[6] S[2] S[3] S[4] S[5]
++++ ++++ ++++ +++ ++++ ++++ +++
           
 ++  ++  ++   ++  ++ 
v  v  v  v v  v  v
++  ++  ++  ++ ++  ++  ++
AES<X0 +>AES +>XOR +>AES AES<X1 +>AES +>AES
+++ +++ +++ +++ +++ +++ +++
      
v v v v v v v
++ ++ ++ ++ ++ ++ ++
Snew Snew Snew Snew Snew Snew Snew
 [1]  [2]  [0]  [3]  [4]  [5]  [6]
++ ++ ++ ++ ++ ++ ++
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Figure 1: Illustration of the Round Function
2.3. Specification
RoccaS is an AEAD scheme composed of four phases: initialization,
processing the associated data, encryption, and finalization. The
input consists of a 256bit key K = K0K1, a nonce N of between 12
and 16 octets (both inclusive) in length, the associated data AD, and
the message M. The output is the corresponding ciphertext C and a
256bit tag T.
The settings described below are required for the parameters:
* The key K MUST be unpredictable for each invocation.
* PADN(N), where N is the nonce, MUST be unique per invocation with
the same key, so N MUST NOT be randomly generated.
2.3.1. Initialization
First, (N,K0,K1) is loaded into the state S in the following way:
S[0] = K1,
S[1] = PADN(N),
S[2] = Z0,
S[3] = K0,
S[4] = Z1,
S[5] = PADN(N) ^ K1,
S[6] = ZERO(128)
Then, 16 iterations of the round function R(S,Z0,Z1), which is
written as R(S,Z0,Z1)#(16), are applied to state S.
After 16 iterations of the round function, two 128bit keys are XORed
with the state S in the following way:
S[0] = S[0] ^ K0,
S[1] = S[1] ^ K0,
S[2] = S[2] ^ K1,
S[3] = S[3] ^ K0,
S[4] = S[4] ^ K0,
S[5] = S[5] ^ K1,
S[6] = S[6] ^ K1.
2.3.2. Processing the Associated Data
If AD is empty, this phase will be skipped. Otherwise, AD is padded
to PAD(AD), and the state is updated as follows:
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for i = 0 to d  1
R(S, PAD(AD)[i]_0, PAD(AD)[i]_1),
end for
where d = PAD(AD) / 256.
2.3.3. Encryption
The encryption phase is similar to the phase to process the
associated data. If M is empty, the encryption phase will be
skipped. Otherwise, M is first padded to PAD(M), and then PAD(M)
will be absorbed with the round function. During this procedure, the
ciphertext C is generated. If the last block of M is incomplete and
its length is b bits, i.e., 0 < b < 256, the last block of C will be
truncated to the first b bits. A detailed description is shown
below:
for i = 0 to m  1
C[i]_0 = AES(S[3] ^ S[5], S[0]) ^ PAD(M)[i]_0,
C[i]_1 = AES(S[4] ^ S[6], S[2]) ^ PAD(M)[i]_1,
R(S, PAD(M)[i]_0, PAD(M)[i]_1),
end for
where m = PAD(M) / 256.
2.3.4. Finalization
The state S will again pass through 16 iterations of the round
function R(S,LE128(AD),LE128(M)) and then the 256bit tag T is
computed in the following way:
T = (S[0] ^ S[1] ^ S[2] ^ S[3])  (S[4] ^ S[5] ^ S[6])
2.3.5. RoccaS Algorithm
A formal description of RoccaS can be seen in Figure 2, and the
corresponding illustration is shown in Figure 3.
// RoccaS Algorithm. The specification of RoccaS
procedure RoccaEncrypt(K0, K1, N, AD, M)
S = Initialization(N,K0,K1)
if AD > 0 then
S = ProcessAD(S,PAD(AD))
if M > 0 then
S = Encryption(S,PAD(M),C)
Truncate C
T = Finalization(S, AD, M)
return (C, T)
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procedure RoccaDecrypt(K0, K1, N, AD, C, T)
S = Initialization(N,K0,K1)
if AD > 0 then
S = ProcessAD(S,PAD(AD))
if C > 0 then
S = Decryption(S,PAD(C),M)
Truncate M
if T == Finalization(S, AD, C) then
return M
else
return nil
procedure Initialization(N, K0, K1)
S[0] = K1,
S[1] = PADN(N),
S[2] = Z0,
S[3] = K0,
S[4] = Z1,
S[5] = PADN(N) ^ K1,
S[6] = ZERO(128)
for i = 0 to 15 do
S = R(S, Z0, Z1)
S[0] = S[0] ^ K0,
S[1] = S[1] ^ K0,
S[2] = S[2] ^ K1,
S[3] = S[3] ^ K0,
S[4] = S[4] ^ K0,
S[5] = S[5] ^ K1,
S[6] = S[6] ^ K1
return S
procedure ProcessAD(S, AD)
d = PAD(AD)/256
for i = 0 to d  1 do
S = R(S, AD[i]_0, AD[i]_1)
return S
procedure Encryption(S, M, C)
m = PAD(M)/256
for i = 0 to m  1 do
C[i]_0 = AES(S[3] ^ S[5], S[0]) ^ M[i]_0
C[i]_1 = AES(S[4] ^ S[6], S[2]) ^ M[i]_1
S = R(S,M[i]_0, M[i]_1)
return S
procedure Decryption(S, M, C)
c = C/256
for i = 0 to c  1 do
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M[i]_0 = AES(S[3] ^ S[5], S[0]) ^ C[i]_0
M[i]_1 = AES(S[4] ^ S[6], S[2]) ^ C[i]_1
S = R(S,M[i]_0, M[i]_1)
return S
procedure Finalization(S, AD, M)
for i = 0 to 15 do
S = R(S, AD, M)
T0 = S[0] ^ S[1] ^ S[2] ^ S[3]
T1 = S[4] ^ S[5] ^ S[6]
return T0T1
Figure 2: The Specification of RoccaS
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Z1 AD[0]_1 AD[1]_1
  
v v v
++ ++ ++
PADN(N)>     
R#(16)+> R +> R +>...+
K0K1>  ^     
++  ++ ++ 
^ K0K1 ^ ^ 
   
Z0 AD[0]_0 AD[1]_0 

++

 C[0]_1 C[1]_1 C[m1]_1
 ^ ^ ^
    AD
 +++ +++ +++ 
 AD[d1]_1 XOR<M[0]_1 XOR<M[1]_1 XOR<M[m1]_1 
  ++  ++  ++  
 v ^ v ^ v ^ v 
 ++  ++  ++  ++ v
  ++  ++   +   ++
          
+> R +> R +> R +>...> R +>R#(16)+>T
         
 ++  ++   +   ++
++  ++  ++  ++ ^
^ v ^ v ^ v ^ 
 ++  ++  ++  
XOR<M[0]_0 XOR<M[1]_0 XOR<M[m1]_0 M
AD[d1]_0 +++ +++ +++
  
v v v
C[0]_0 C[1]_0 C[m1]_0
Figure 3: The Procedure of RoccaS
2.3.6. A Raw Encryption Scheme
If the phases of processing the associated data and finalization are
removed, a raw encryption scheme is obtained.
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2.3.7. A Keystream Generation Scheme
If the phases of processing the associated data and finalization are
removed, and there is no message injection into the round function
such that R(S,0,0), a keystream generation scheme is obtained. This
scheme can be used as a general stream cipher and for random bit
generation.
2.3.8. Support for Shorter Key Length
For RoccaS to support 128bit or 192bit keys, the given key needs
to be expanded to 256 bits. When a 128bit key is given, it will be
set to K0, and K1 is defined as K1 = ZERO(128). When a 192bit key
is given, the first 128bit will be set to K0, and the remaining
64bit will be set to K1_p. Then K1 is defined as K1 =
K1_pZERO(64).
The use of Key Derivation Functions (KDF) [KDF] to stretch the key
length to 256bit could be another option. The given 128bit or
192bit key will be used as a key derivation key, and the output of
the KDF will be 256bit.
2.3.9. Settings as AEAD Algorithm Specifications
To comply with the requirements defined in Section 4 of [RFC5116],
the settings of the parameters for RoccaS are defined as follows:
* K_LEN (key length) is 32 octets (256 bits), and K (key) does not
require any particular data format.
* P_MAX (maximum size of the plaintext) is 2#125 octets.
* A_MAX (maximum size of the associated data) is 2#61 octets.
* N_MIN (minimum size of the nonce) = 12 octets, and N_MAX (maximum
size of the nonce) = 16 octets.
* C_MAX (the largest possible AEAD ciphertext) = P_MAX + tag length
= 2#125 + 32 octets.
In addition,
* RoccaS does not structure its ciphertext output with the
authentication tag.
* RoccaS is not randomized or is not stateful in the meanings of
the section 4 of [RFC5116].
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2.4. Security Claims
2.4.1. Classic Setting
As described in Section 3, RoccaS provides 256bit security against
keyrecovery and 192bit security against forgery attacks in the
noncerespecting setting. We do not claim its security in the
relatedkey and knownkey settings.
The message length for a fixed key is limited to at most 2#128, and
we also limit the number of different messages that are produced for
a fixed key to be at most 2#128. The length of the associated data
for a fixed key is up to 2#64.
2.4.2. Quantum Setting
RoccaS provides 128bit security against keyrecovery and forgery
attacks against quantum adversary with classical online queries.
RoccaS does not claim security against online quantum superposition
attacks.
3. Security Considerations
3.1. Security Against Attacks
RoccaS is secure against the following attacks:
1. KeyRecovery Attack: 256bit security against keyrecovery
attacks.
2. Differential Attack: Secure against differential attacks in the
initialization phase.
3. Forgery Attack: 192bit security against forgery attacks.
4. Integral Attack: Secure against integral attacks.
5. Staterecovery Attack:
* GuessandDetermine Attack: The time complexity of the guess
anddetermine attack cannot be lower than 2#256.
* Algebraic Attack: The system of equations, which needs to be
solved in algebraic attacks to RoccaS, cannot be solved with
time complexity 2#256.
6. The Linear Bias: Secure against a statistical attack.
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The details can be found in the paper [ROCCAS].
3.2. Other Attacks
While there are many attack vectors for block ciphers, their
application to RoccaS is restrictive, as the attackers can only know
partial information about the internal state from the ciphertext
blocks. In other words, reversing the round function is impossible
in RoccaS without guessing many secret state blocks. Therefore,
only the above potential attack vectors are taken into account. In
addition, due to the usage of the constant (Z0,Z1) at the
initialization phase, the attack based on the similarity in the four
columns of the AES state is also excluded.
3.3. Nonce Reuse
Inadvertent reuse of the same nonce by two invocations of the RoccaS
encryption operation, with the same key, undermines the security of
the messages processed with those invocations. A loss of
confidentiality ensues because an adversary will be able to
reconstruct the bitwise exclusiveor of the two plaintext values.
3.4. Tag Verificatoin Failure
When the tag verification fails during the decryption phase, it is
reccomended to erase the plaintext and computed tag.
4. IANA Considerations
IANA has assigned value TBD in the AEAD Algorithms registry to
AEAD_ROCCA.
5. References
5.1. Normative References
[RFC2119] Bradner, S., "Key words for use in RFCs to Indicate
Requirement Levels", BCP 14, RFC 2119,
DOI 10.17487/RFC2119, March 1997,
.
[RFC5116] McGrew, D., "An Interface and Algorithms for Authenticated
Encryption", RFC 5116, DOI 10.17487/RFC5116, January 2008,
.
[RFC8174] Leiba, B., "Ambiguity of Uppercase vs Lowercase in RFC
2119 Key Words", BCP 14, RFC 8174, DOI 10.17487/RFC8174,
May 2017, .
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5.2. Informative References
[AEGIS] Preneel, B., "AEGIS: A fast authenticated encryption
algorithm", Selected Areas in Cryptography (SAC 2013)
pp.185201, 2013.
[AES] National Institute of Standards and Technology, "FIPS 197
Advanced Encryption Standard (AES)", 2001,
.
[AESNI] Gueron, S., "Intel Advanced Encryption Standard (AES) New
Instructions Set", 2010,
.
[CAESAR] "CAESAR: Competition for Authenticated Encryption:
Security, Applicability, and Robustness", 2018,
.
[DESIGN] Jean, J. and I. Nikolic, "Efficient Design Strategies
Based on the AES Round Function", In: Peyrin, T. (eds)
Fast Software Encryption. FSE 2016. Lecture Notes in
Computer Science, vol 9783, 2016,
.
[KDF] Chena, L., "Recommendation for Key Derivation Using
Pseudorandom Functions (Revised)", NIST Special
Publication 800108, 2009,
.
[ROCCAS] Anand, R., Banik, S., Caforio, A., Fukushima, K., Isobe,
T., Kiyomoto, S., Liu, F., Nakano, Y., Sakamoto, K., and
N. Takeuchi, "An UltraHigh Throughput AESBased
Authenticated Encryption Scheme for 6G: Design and
Implementation", 28th European Symposium on Research in
Computer Security, ESORICS 2023, 2024,
.
[SNOWV] Ekdahl, P., Johansson, T., Maximov, A., and J. Yang, "A
new SNOW stream cipher called SNOWV", IACR Transactions
on Symmetric Cryptology, 2019(3), 142, 2019,
.
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[SPEC5G] 3GPP SA3, "Study on the support of 256bit algorithms for
5G", 2018,
.
[TIAOXIN] Nikolic, I., "Tiaoxin346: VERSION 2.0", CAESAR
Competition, 2014,
.
[WP6G] Latvaaho, M. and K. Leppaenen, "Key drivers and research
challenges for 6G ubiquitous wireless intelligence", 2019.
Appendix A. Software Implementation
A.1. Implementation with SIMD Instructions
Figure 4 shows a sample implementation of RoccaS.
#include
#include
#include
#include
#define ROCCA_KEY_SIZE (32)
#define ROCCA_IV_SIZE (16)
#define ROCCA_MSG_BLOCK_SIZE (32)
#define ROCCA_TAG_SIZE (32)
#define ROCCA_STATE_NUM ( 7)
typedef struct ROCCA_CTX {
uint8_t key[ROCCA_KEY_SIZE/16][16];
uint8_t state[ROCCA_STATE_NUM][16];
size_t size_ad;
size_t size_m;
} rocca_context;
#define load(m) _mm_loadu_si128((const __m128i *)(m))
#define store(m,a) _mm_storeu_si128((__m128i *)(m),a)
#define xor(a,b) _mm_xor_si128(a,b)
#define and(a,b) _mm_and_si128(a,b)
#define enc(a,k) _mm_aesenc_si128(a,k)
#define setzero() _mm_setzero_si128()
#define ENCODE_IN_LITTLE_ENDIAN(bytes, v) \
bytes[ 0] = ((uint64_t)(v) << ( 3)); \
bytes[ 1] = ((uint64_t)(v) >> (1 * 8  3)); \
bytes[ 2] = ((uint64_t)(v) >> (2 * 8  3)); \
bytes[ 3] = ((uint64_t)(v) >> (3 * 8  3)); \
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bytes[ 4] = ((uint64_t)(v) >> (4 * 8  3)); \
bytes[ 5] = ((uint64_t)(v) >> (5 * 8  3)); \
bytes[ 6] = ((uint64_t)(v) >> (6 * 8  3)); \
bytes[ 7] = ((uint64_t)(v) >> (7 * 8  3)); \
bytes[ 8] = ((uint64_t)(v) >> (8 * 8  3)); \
bytes[ 9] = 0; \
bytes[10] = 0; \
bytes[11] = 0; \
bytes[12] = 0; \
bytes[13] = 0; \
bytes[14] = 0; \
bytes[15] = 0;
#define FLOORTO(a,b) ((a) / (b) * (b))
#define S_NUM ROCCA_STATE_NUM
#define M_NUM ( 2)
#define INIT_LOOP (16)
#define TAG_LOOP (16)
#define VARS4UPDATE \
__m128i k[2], state[S_NUM], stateNew[S_NUM], M[M_NUM];
#define VARS4ENCRYPT \
VARS4UPDATE \
__m128i Z[M_NUM], C[M_NUM];
#define COPY_TO_LOCAL(ctx) \
for(size_t i = 0; i < S_NUM; ++i) \
{ state[i] = load(&((ctx)>state[i][0])); }
#define COPY_FROM_LOCAL(ctx) \
for(size_t i = 0; i < S_NUM; ++i) \
{ store(&((ctx)>state[i][0]), state[i]); }
#define COPY_TO_LOCAL_IN_TAG(ctx) \
COPY_TO_LOCAL(ctx) for(size_t i = 0; i < 2; ++i) \
{ k[i] = load(&((ctx)>key[i][0])); }
#define COPY_FROM_LOCAL_IN_INIT(ctx) \
COPY_FROM_LOCAL(ctx) for(size_t i = 0; i < 2; ++i) \
{ store(&((ctx)>key[i][0]), k[i]); }
#define UPDATE_STATE(X) \
stateNew[0] = xor(state[6], state[1]); \
stateNew[1] = enc(state[0], X[0]); \
stateNew[2] = enc(state[1], state[0]); \
stateNew[3] = enc(state[2], state[6]); \
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stateNew[4] = enc(state[3], X[1]); \
stateNew[5] = enc(state[4], state[3]); \
stateNew[6] = enc(state[5], state[4]); \
for(size_t i = 0; i < S_NUM; ++i) \
{state[i] = stateNew[i];}
#define INIT_STATE(key, iv) \
k[0] = load((key) + 16*0); \
k[1] = load((key) + 16*1); \
state[0] = k[1]; \
state[1] = load(iv); \
state[2] = load(Z0); \
state[3] = k[0]; \
state[4] = load(Z1); \
state[5] = xor(state[1], state[0]); \
state[6] = setzero(); \
M[0] = state[2]; \
M[1] = state[4]; \
for(size_t i = 0; i < INIT_LOOP; ++i) { \
UPDATE_STATE(M) \
} \
state[0] = xor(state[0], k[0]); \
state[1] = xor(state[1], k[0]); \
state[2] = xor(state[2], k[1]); \
state[3] = xor(state[3], k[0]); \
state[4] = xor(state[4], k[0]); \
state[5] = xor(state[5], k[1]); \
state[6] = xor(state[6], k[1]);
#define MAKE_STRM \
Z[0] = enc(xor(state[3], state[5]), state[0]); \
Z[1] = enc(xor(state[4], state[6]), state[2]);
#define MSG_LOAD(mem, reg) \
reg[0] = load((mem) + 0); \
reg[1] = load((mem) + 16);
#define MSG_STORE(mem, reg) \
store((mem) + 0, reg[0]); \
store((mem) + 16, reg[1]);
#define XOR_BLOCK(dst, src1, src2) \
dst[0] = xor(src1[0], src2[0]); \
dst[1] = xor(src1[1], src2[1]);
#define MASKXOR_BLOCK(dst, src1, src2, mask) \
dst[0] = and(xor(src1[0], src2[0]), mask[0]); \
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dst[1] = and(xor(src1[1], src2[1]), mask[1]);
#define ADD_AD(input) \
MSG_LOAD(input, M) \
UPDATE_STATE(M)
#define ADD_AD_LAST_BLOCK(input, size) \
uint8_t tmpblk[ROCCA_MSG_BLOCK_SIZE] = {0}; \
memcpy(tmpblk, input, size); \
MSG_LOAD(tmpblk, M) \
UPDATE_STATE(M)
#define ENCRYPT(output, input) \
MSG_LOAD(input, M) \
MAKE_STRM \
XOR_BLOCK(C, M, Z) \
MSG_STORE(output, C) \
UPDATE_STATE(M)
#define ENCRYPT_LAST_BLOCK(output, input, size) \
uint8_t tmpblk[ROCCA_MSG_BLOCK_SIZE] = {0}; \
memcpy(tmpblk, input, size); \
MSG_LOAD(tmpblk, M) \
MAKE_STRM \
XOR_BLOCK(C, M, Z) \
MSG_STORE(tmpblk, C) \
memcpy(output, tmpblk, size); \
UPDATE_STATE(M)
#define DECRYPT(output, input) \
MSG_LOAD(input, C) \
MAKE_STRM \
XOR_BLOCK(M, C, Z) \
MSG_STORE(output, M) \
UPDATE_STATE(M)
#define DECRYPT_LAST_BLOCK(output, input, size) \
uint8_t tmpblk[ROCCA_MSG_BLOCK_SIZE] = {0}; \
uint8_t tmpmsk[ROCCA_MSG_BLOCK_SIZE] = {0}; \
__m128i mask[M_NUM]; \
memcpy(tmpblk, input, size); \
memset(tmpmsk, 0xFF , size); \
MSG_LOAD(tmpblk, C ) \
MSG_LOAD(tmpmsk, mask) \
MAKE_STRM \
MASKXOR_BLOCK(M, C, Z, mask) \
MSG_STORE(tmpblk, M) \
memcpy(output, tmpblk, size); \
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UPDATE_STATE(M)
#define SET_AD_BITLEN_MSG_BITLEN(sizeAD, sizeM) \
uint8_t bitlenAD[16]; \
uint8_t bitlenM [16]; \
ENCODE_IN_LITTLE_ENDIAN(bitlenAD, sizeAD); \
ENCODE_IN_LITTLE_ENDIAN(bitlenM , sizeM ); \
M[0] = load(bitlenAD); \
M[1] = load(bitlenM );
#define MAKE_TAG(sizeAD, sizeM, tag) \
SET_AD_BITLEN_MSG_BITLEN(sizeAD, sizeM) \
for(size_t i = 0; i < TAG_LOOP; ++i) { \
UPDATE_STATE(M) \
} \
__m128i tag128a = setzero(); \
for(size_t i = 0; i <= 3; ++i) { \
tag128a = xor(tag128a, state[i]); \
} \
__m128i tag128b = setzero(); \
for(size_t i = 4; i <= 6; ++i) { \
tag128b = xor(tag128b, state[i]); \
} \
store((tag) , tag128a); \
store((tag)+16, tag128b);
static const uint8_t Z0[] = {0xcd,0x65,0xef,0x23,0x91, \
0x44,0x37,0x71,0x22,0xae,0x28,0xd7,0x98,0x2f,0x8a,0x42};
static const uint8_t Z1[] = {0xbc,0xdb,0x89,0x81,0xa5, \
0xdb,0xb5,0xe9,0x2f,0x3b,0x4d,0xec,0xcf,0xfb,0xc0,0xb5};
void rocca_init(rocca_context * ctx, const uint8_t * key, \
const uint8_t * iv) {
VARS4UPDATE
INIT_STATE(key, iv);
COPY_FROM_LOCAL_IN_INIT(ctx);
ctx>size_ad = 0;
ctx>size_m = 0;
}
void rocca_add_ad(rocca_context * ctx, const uint8_t * in, size_t size)
{
VARS4UPDATE
COPY_TO_LOCAL(ctx);
size_t i = 0;
for(size_t size2 = FLOORTO(size, ROCCA_MSG_BLOCK_SIZE); \
i < size2; i += ROCCA_MSG_BLOCK_SIZE) {
ADD_AD(in + i);
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}
if(i < size) {
ADD_AD_LAST_BLOCK(in + i, size  i);
}
COPY_FROM_LOCAL(ctx);
ctx>size_ad += size;
}
void rocca_encrypt(rocca_context * ctx, uint8_t * out, \
const uint8_t * in, size_t size) {
VARS4ENCRYPT
COPY_TO_LOCAL(ctx);
size_t i = 0;
for(size_t size2 = FLOORTO(size, ROCCA_MSG_BLOCK_SIZE); \
i < size2; i += ROCCA_MSG_BLOCK_SIZE) {
ENCRYPT(out + i, in + i);
}
if(i < size) {
ENCRYPT_LAST_BLOCK(out + i, in + i, size  i);
}
COPY_FROM_LOCAL(ctx);
ctx>size_m += size;
}
void rocca_decrypt(rocca_context * ctx, uint8_t * out, \
const uint8_t * in, size_t size) {
VARS4ENCRYPT
COPY_TO_LOCAL(ctx);
size_t i = 0;
for(size_t size2 = FLOORTO(size, ROCCA_MSG_BLOCK_SIZE); \
i < size2; i += ROCCA_MSG_BLOCK_SIZE) {
DECRYPT(out + i, in + i);
}
if(i < size) {
DECRYPT_LAST_BLOCK(out + i, in + i, size  i);
}
COPY_FROM_LOCAL(ctx);
ctx>size_m += size;
}
void rocca_tag(rocca_context * ctx, uint8_t *tag) {
VARS4UPDATE
COPY_TO_LOCAL_IN_TAG(ctx);
MAKE_TAG(ctx>size_ad, ctx>size_m, tag);
}
Figure 4: Reference Implementation with SIMD
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A.2. Test Vector
This section gives three test vectors of RoccaS. The least
significant octet of the vector is shown on the left and the first
128bit value is shown on the first line.
=== test vector #1===
key =
00000000000000000000000000000000
00000000000000000000000000000000
nonce =
00000000000000000000000000000000
associated data =
00000000000000000000000000000000
00000000000000000000000000000000
plaintext =
00000000000000000000000000000000
00000000000000000000000000000000
00000000000000000000000000000000
00000000000000000000000000000000
ciphertext =
9ac3326495a8d414fe407f47b5441050
2481cf79cab8c0a669323e07711e4617
0de5b2fbba0fae8de7c1fccaeefc3626
24fcfdc15f8bb3e64457e8b7e37557bb
tag =
8df934d1483710c9410f6a089c4ced97
91901b7e2e661206202db2cc7a24a386
=== test vector #2===
key =
01010101010101010101010101010101
01010101010101010101010101010101
nonce =
01010101010101010101010101010101
associated data =
01010101010101010101010101010101
01010101010101010101010101010101
plaintext =
00000000000000000000000000000000
00000000000000000000000000000000
00000000000000000000000000000000
00000000000000000000000000000000
ciphertext =
559ecb253bcfe26b483bf00e9c748345
978ff921036a6c1fdcb712172836504f
bc64d430a73fc67acd3c3b9c1976d807
90f48357e7fe0c0682624569d3a658fb
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tag =
c1fdf39762eca77da8b0f1dae5fff75a
92fb0adfa7940a28c8cadbbbe8e4ca8d
=== test vector #3===
key =
0123456789abcdef0123456789abcdef
0123456789abcdef0123456789abcdef
nonce =
0123456789abcdef0123456789abcdef
associated data =
0123456789abcdef0123456789abcdef
0123456789abcdef0123456789abcdef
plaintext =
00000000000000000000000000000000
00000000000000000000000000000000
00000000000000000000000000000000
00000000000000000000000000000000
ciphertext =
b5fc4e2a72b86d1a133c0f0202bdf790
af14a24b2cdb676e427865e12fcc9d30
21d18418fc75dc1912dd2cd79a3beeb2
a98b235de2299b9dda93fd2b5ac8f436
tag =
a078e1351ef2420c8e3a93fd31f5b113
5b15315a5f205534148efbcd63f79f00
=== test vector #4===
key =
11111111111111111111111111111111
22222222222222222222222222222222
nonce =
44444444444444444444444444444444
associated data =
plaintext =
808182838485868788898a8b8c8d8e8f
909192939495969798999a9b9c9d9e9f
a0a1a2a3a4a5a6a7
ciphertext =
e8c7adcc58302893b253c544f5d8e62d
8fbd81160c2f4a95123962088d29f106
422d3f26882fd7b1
tag =
f650eba86fb19dc14a3bbe8bbfad9ec5
b5dd77a4c3f83d2c19ac0393dd47928f
=== test vector #5===
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key =
11111111111111111111111111111111
22222222222222222222222222222222
nonce =
44444444444444444444444444444444
associated data =
plaintext =
808182838485868788898a8b8c8d8e8f
909192939495969798999a9b9c9d9e9f
a0a1a2a3a4a5a6a7a8a9aaabacadaeaf
ciphertext =
e8c7adcc58302893b253c544f5d8e62d
8fbd81160c2f4a95123962088d29f106
422d3f26882fd7b1fdee5680476e7e6e
tag =
49bb0ec78cab2c5f40a535925fa2d827
52aba9606426537fc774f06fc0f6fc12
=== test vector #6===
key =
11111111111111111111111111111111
22222222222222222222222222222222
nonce =
44444444444444444444444444444444
associated data =
plaintext =
808182838485868788898a8b8c8d8e8f
909192939495969798999a9b9c9d9e9f
a0a1a2a3a4a5a6a7a8a9aaabacadaeaf
b0b1b2b3b4b5b6b7b8
ciphertext =
e8c7adcc58302893b253c544f5d8e62d
8fbd81160c2f4a95123962088d29f106
422d3f26882fd7b1fdee5680476e7e6e
1fc473cdb2dded85c6
tag =
c674604803963a4b51685fda1f2aa043
934736db2fbab6d188a09f5e0d1c0bf3
=== test vector #7===
key =
11111111111111111111111111111111
22222222222222222222222222222222
nonce =
44444444444444444444444444444444
associated data =
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plaintext =
808182838485868788898a8b8c8d8e8f
909192939495969798999a9b9c9d9e9f
a0a1a2a3a4a5a6a7a8a9aaabacadaeaf
b0b1b2b3b4b5b6b7b8b9babbbcbdbebf
ciphertext =
e8c7adcc58302893b253c544f5d8e62d
8fbd81160c2f4a95123962088d29f106
422d3f26882fd7b1fdee5680476e7e6e
1fc473cdb2dded85c692344f3ab85af0
tag =
850599a6624a3e936a77768c7717b926
cc519081730df447127654d6980bcb02
Acknowledgements
This draft is partially supported by a contract of "Research and
development on new generation cryptography for secure wireless
communication services" among "Research and Development for Expansion
of Radio Wave Resources (JPJ000254)", which was supported by the
Ministry of Internal Affairs and Communications, Japan.
Authors' Addresses
Yuto Nakano
KDDI Research, Inc.
2115 Ohara, Fujiminoshi, Saitama,
3568502
Japan
Email: ytnakano@kddi.com
Kazuhide Fukushima
KDDI Research, Inc.
2115 Ohara, Fujiminoshi, Saitama,
3568502
Japan
Email: kafukushima@kddi.com
Takanori Isobe
University of Hyogo
7128 Minatojima Minamimachi, Chuoku, Kobeshi, Hyogo,
6500047
Japan
Email: takanori.isobe@ai.uhyogo.ac.jp
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