Commitment schemes are important tools in cryptography and used as building blocks in many cryptographic protocols. We propose two commitment schemes by using Rubik’s groups. Our proposals do not lay the security on the taken-for-granted hardness of the word problem over Rubik’s groups. Instead, our first proposal is based on a symmetric encryption algorithm that is secure based on the hardness of the conjugacy search problem over Rubik’s groups, while our second proposal is based on the hardness of a newly derived problem—the functional towering conjugacy search problem over Rubik’s groups. The former is proved secure in the sense of both computational hiding and binding, while the latter is proved even secure in the sense of perfect hidin...
The generic-group model (GGM) aims to capture algorithms working over groups of prime order that onl...
In the presented work we focus on applications of decision problems from combinatorial group theory....
Abstract. The generic group model is a valuable methodology for analyzing the computational hardness...
Abstract. After some excitement generated by recently suggested public key exchange protocols due to...
This book is about relations between three different areas of mathematics and theoretical computer s...
In this article, we present a new key exchange protocol which works in the division semiring. We pro...
Abstract. We propose a new digital signature scheme based on a non-commutative group where the conju...
We demonstrate that recent advances in the theory of braid groups, in particular a new invariant of ...
In this paper we cryptanalyze two protocols: Grigoriev-Shpilrain authentication protocol and Wang et...
The key exchange protocol is a method of securely sharing cryptographic keys over a public channel. ...
Abstract. We present a statistically-hiding commitment scheme allowing commitment to arbitrary size ...
We put forward a new technique to construct very efficient and compact signature schemes. Our techni...
Abstract. The braid groups are infinite non-commutative groups naturally arising from geometric brai...
We propose a new computational problem over the noncommutative group, called the twin conjugacy sear...
We give a complete characterization both in terms of security and design of all currently existing g...
The generic-group model (GGM) aims to capture algorithms working over groups of prime order that onl...
In the presented work we focus on applications of decision problems from combinatorial group theory....
Abstract. The generic group model is a valuable methodology for analyzing the computational hardness...
Abstract. After some excitement generated by recently suggested public key exchange protocols due to...
This book is about relations between three different areas of mathematics and theoretical computer s...
In this article, we present a new key exchange protocol which works in the division semiring. We pro...
Abstract. We propose a new digital signature scheme based on a non-commutative group where the conju...
We demonstrate that recent advances in the theory of braid groups, in particular a new invariant of ...
In this paper we cryptanalyze two protocols: Grigoriev-Shpilrain authentication protocol and Wang et...
The key exchange protocol is a method of securely sharing cryptographic keys over a public channel. ...
Abstract. We present a statistically-hiding commitment scheme allowing commitment to arbitrary size ...
We put forward a new technique to construct very efficient and compact signature schemes. Our techni...
Abstract. The braid groups are infinite non-commutative groups naturally arising from geometric brai...
We propose a new computational problem over the noncommutative group, called the twin conjugacy sear...
We give a complete characterization both in terms of security and design of all currently existing g...
The generic-group model (GGM) aims to capture algorithms working over groups of prime order that onl...
In the presented work we focus on applications of decision problems from combinatorial group theory....
Abstract. The generic group model is a valuable methodology for analyzing the computational hardness...