Difference between revisions of "CubeHash"

Type of Analysis	Hash Size (n)	Parameters/Variants	Compression Function Calls	Memory Requirements	Reference
preimage	384,512	r/32	2^383.7	-	Ferguson,Lucks,McKay
preimage	384,512	r/33	2^257.6	-	Ferguson,Lucks,McKay
collision	512	7/64	2²⁰³	-	Brier,Khazaei,Meier,Peyrin
collision	all	4/48	example (2³⁷)	-	Brier,Khazaei,Meier,Peyrin
collision	all	4/64	example (2³⁴)	-	Brier,Khazaei,Meier,Peyrin
collision	all	3/64	example (2²⁴)	-	Brier,Khazaei,Meier,Peyrin
collision	512	2/2	2¹⁹⁶	-	Brier,Khazaei,Meier,Peyrin
collision	512	5/64	2²³¹	-	Brier,Peyrin
collision	all	3/64	2⁸⁹	-	Brier,Peyrin
collision	512	4/3	2²⁰⁷	-	Brier,Peyrin
collision	384,512	4/4	2¹⁸⁹	-	Brier,Peyrin
collision	all	2/3	2⁴⁶	-	Brier,Peyrin
collision	512	2/4	example	-	Brier,Peyrin
collision	512	1/45, 2/89	example	-	Dai
collision	512	2/120	example	-	Aumasson
preimage	512	r/8	2⁴⁸⁰	-	Khovratovich,Nikolic',Weinmann
preimage	512	r/4	2⁴⁹⁶	-	Khovratovich,Nikolic',Weinmann
preimage	512	r/1 (round 1)	2⁵¹¹	2⁵⁰⁸	Khovratovich,Nikolic',Weinmann
preimage	all	r/b	2^513-4b	-	Aumasson,Meier,Naya-Plasencia,Peyrin
collision	all	r/b	2^{521-4b-log b}	-	submission document
preimage	all	r/b	2^{522-4b-log b}	-	submission document

2.2 Building blocks

Here we list results on underlying building blocks, and the hash function modified by other means than the security parameter.

Note that these results assume more direct control or access over some internal variables (aka. free-start, pseudo, compression function, block cipher, or permutation attacks).

Type of Analysis	Hash Function Part	Hash Size (n)	Parameters/Variants	Compression Function Calls	Memory Requirements	Reference
distinguisher	permutation	all	14 rounds	2⁸¹²		Ashur,Dunkelman
distinguisher	permutation	all	11 rounds	2⁴⁷⁰		Ashur,Dunkelman
observations	hash	all				Kaminsky
observations	hash	all				Bloom,Kaminsky
multi-collision	hash	all		2^513-4b	-	Aumasson,Meier,Naya-Plasencia,Peyrin
observations	permutation	all				Aumasson,Meier,Naya-Plasencia,Peyrin

Tomer Ashur, Orr Dunkelman - Linear Analysis of Reduced-Round CubeHash

,2010

http://eprint.iacr.org/2010/535.pdf
Bibtex

Author : Tomer Ashur, Orr Dunkelman
Title : Linear Analysis of Reduced-Round CubeHash
In : -
Address :
Date : 2010

Niels Ferguson, Stefan Lucks, Kerry A. McKay - Symmetric States and their Structure: Improved Analysis of CubeHash

,2010

http://eprint.iacr.org/2010/273.pdf
Bibtex

Author : Niels Ferguson, Stefan Lucks, Kerry A. McKay
Title : Symmetric States and their Structure: Improved Analysis of CubeHash
In : -
Address :
Date : 2010

Alan Kaminsky - Cube Test Analysis of the Statistical Behavior of CubeHash and Skein

,2010

http://eprint.iacr.org/2010/262.pdf
Bibtex

Author : Alan Kaminsky
Title : Cube Test Analysis of the Statistical Behavior of CubeHash and Skein
In : -
Address :
Date : 2010

Benjamin Bloom, Alan Kaminsky - Single Block Attacks and Statistical Tests on CubeHash

,2009

http://eprint.iacr.org/2009/407.pdf
Bibtex

Author : Benjamin Bloom, Alan Kaminsky
Title : Single Block Attacks and Statistical Tests on CubeHash
In : -
Address :
Date : 2009

Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin - Linearization Framework for Collision Attacks: Application to CubeHash and MD6

,2009

http://eprint.iacr.org/2009/382.pdf
Bibtex

Author : Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin
Title : Linearization Framework for Collision Attacks: Application to CubeHash and MD6
In : -
Address :
Date : 2009

Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin - Real Collisions for CubeHash-4/48

,2009

http://ehash.iaik.tugraz.at/uploads/5/50/Bkmp_ch448.txt
Bibtex

Author : Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin
Title : Real Collisions for CubeHash-4/48
In : -
Address :
Date : 2009

Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin - Real Collisions for CubeHash-4/64

,2009

http://ehash.iaik.tugraz.at/uploads/9/93/Bkmp_ch464.txt
Bibtex

Author : Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin
Title : Real Collisions for CubeHash-4/64
In : -
Address :
Date : 2009

Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin - Attack for CubeHash-2/2 and collision for CubeHash-3/64

,2009

http://ehash.iaik.tugraz.at/uploads/3/3a/Peyrin_ch22_ch364.txt
Bibtex

Author : Eric Brier, Shahram Khazaei, Willi Meier, Thomas Peyrin
Title : Attack for CubeHash-2/2 and collision for CubeHash-3/64
In : -
Address :
Date : 2009

Eric Brier, Thomas Peyrin - Cryptanalysis of CubeHash

,2009

http://thomas.peyrin.googlepages.com/BrierPeyrinCubehash.pdf
Bibtex

Author : Eric Brier, Thomas Peyrin
Title : Cryptanalysis of CubeHash
In : -
Address :
Date : 2009

Wei Dai - Collisions for CubeHash1/45 and CubeHash2/89

,2008

http://www.cryptopp.com/sha3/cubehash.pdf
Bibtex

Author : Wei Dai
Title : Collisions for CubeHash1/45 and CubeHash2/89
In : -
Address :
Date : 2008

Jean-Philippe Aumasson - Collision for CubeHash2/120-512

,2008

http://ehash.iaik.tugraz.at/uploads/a/a9/Cubehash.txt
Bibtex

Author : Jean-Philippe Aumasson
Title : Collision for CubeHash2/120-512
In : -
Address :
Date : 2008

Dmitry Khovratovich, Ivica Nikolic', Ralf-Philipp Weinmann - Preimage attack on CubeHash512-r/4 and CubeHash512-r/8

,2008

http://ehash.iaik.tugraz.at/uploads/6/6c/Cubehash.pdf
Bibtex

Author : Dmitry Khovratovich, Ivica Nikolic', Ralf-Philipp Weinmann
Title : Preimage attack on CubeHash512-r/4 and CubeHash512-r/8
In : -
Address :
Date : 2008

Jean-Philippe Aumasson, Eric Brier, Willi Meier, María Naya-Plasencia, Thomas Peyrin - Inside the Hypercube

ACISP 5594:202-213,2009

http://www.131002.net/data/papers/ABMNP08.pdf
Bibtex

Author : Jean-Philippe Aumasson, Eric Brier, Willi Meier, María Naya-Plasencia, Thomas Peyrin
Title : Inside the Hypercube
In : ACISP -
Address :
Date : 2009

@@ Line 109: / Line 109: @@
 |- style="background:#efefef;"
 | Type of Analysis || Hash Function Part || Hash Size (n) || Parameters/Variants || Compression Function Calls || Memory Requirements ||   Reference
 |-
+| distinguisher || permutation|| all  || 14 rounds  || 2<sup>812</sup> ||  || [http://eprint.iacr.org/2010/535.pdf Ashur,Dunkelman]
+|-
+| distinguisher || permutation|| all  || 11 rounds  || 2<sup>470</sup> ||  || [http://eprint.iacr.org/2010/535.pdf Ashur,Dunkelman]
+|-
 |  observations || hash || all ||  ||  ||  || [http://eprint.iacr.org/2010/262.pdf Kaminsky]
 |-
@@ Line 120: / Line 124: @@
 |}
+<bibtex>
+@misc{cubehashAD10,
+    author = {Tomer Ashur and Orr Dunkelman},
+    title = {Linear Analysis of Reduced-Round CubeHash},
+    howpublished = {Cryptology ePrint Archive, Report 2010/535},
+    year = {2010},
+    url = {http://eprint.iacr.org/2010/535.pdf},
+    note = {\url{http://eprint.iacr.org/}},
+    abtract = {Recent developments in the field of cryptanalysis of hash functions has inspired NIST to announce a competition for selecting a new cryptographic hash function to join the SHA family of standards. One of the 14 second-round candidates is CubeHash designed by Daniel J. Bernstein. CubeHash is a unique hash function in the sense that it does not iterate a common compression function, and offers a structure which resembles a sponge function, even though it is not exactly a sponge function. In this paper we analyze reduced-round variants of CubeHash where the adversary controls the full 1024-bit input to reduced-round CubeHash and can observe its full output. We show that linear approximations with high biases exist in reduced-round variants. For example, we present an 11-round linear approximation with bias of 2^{&#8722;235}, which allows distinguishing 11-round CubeHash using about 2^{470} queries. We also discuss the extension of this distinguisher to 12 rounds using message modification techniques. Finally, we present a linear distinguisher for 14-round CubeHash which uses about 2^{812} queries.. }
+}
+</bibtex>
 <bibtex>

Difference between revisions of "CubeHash"

Revision as of 12:07, 8 November 2010

Contents

1 The algorithm

2 Cryptanalysis

2.1 Hash function

2.2 Building blocks

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