On cheating immune secret sharing

Josef Pieprzyk; Xian Mo Zhang

On cheating immune secret sharing

Josef Pieprzyk^*, Xian Mo Zhang

^*Corresponding author for this work

School of Computing

Research output: Contribution to journal › Article › peer-review

14 Citations (Scopus)

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Abstract

The paper addresses the cheating prevention in secret sharing. We consider secret sharing with binary shares. The secret also is binary. This model allows us to use results and constructions from the well developed theory of cryptographically strong boolean functions. In particular, we prove that for given secret sharing, the average cheating probability over all cheating vectors and all original vectors, i.e., 1/n·2^-nΣ _c=1 ⁿΣ_αεVnρ _c,α, denoted by ρ̄, satisfies ρ̄ ≥ 1/2, and the equality holds if and only if ρ_c,α satisfies ρ_c,α = 1/2 for every cheating vector δ_c and every original vector α. In this case the secret sharing is said to be cheating immune. We further establish a relationship between cheating-immune secret sharing and cryptographic criteria of boolean functions. This enables us to construct cheating-immune secret sharing.

Original language	English
Pages (from-to)	253-264
Number of pages	12
Journal	Discrete Mathematics and Theoretical Computer Science
Volume	6
Issue number	2
Publication status	Published - 2004

Bibliographical note

Copyright 2004 Discrete Mathematics and Theoretical Computer Science (DMTCS). Version archived for private and non-commercial use with the permission of the author/s and according to publisher conditions. For further rights please contact the publisher.

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abstract = "The paper addresses the cheating prevention in secret sharing. We consider secret sharing with binary shares. The secret also is binary. This model allows us to use results and constructions from the well developed theory of cryptographically strong boolean functions. In particular, we prove that for given secret sharing, the average cheating probability over all cheating vectors and all original vectors, i.e., 1/n·2-nΣ c=1 nΣαεVnρ c,α, denoted by {\=ρ}, satisfies {\=ρ} ≥ 1/2, and the equality holds if and only if ρc,α satisfies ρc,α = 1/2 for every cheating vector δc and every original vector α. In this case the secret sharing is said to be cheating immune. We further establish a relationship between cheating-immune secret sharing and cryptographic criteria of boolean functions. This enables us to construct cheating-immune secret sharing.",

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AU - Zhang, Xian Mo

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N2 - The paper addresses the cheating prevention in secret sharing. We consider secret sharing with binary shares. The secret also is binary. This model allows us to use results and constructions from the well developed theory of cryptographically strong boolean functions. In particular, we prove that for given secret sharing, the average cheating probability over all cheating vectors and all original vectors, i.e., 1/n·2-nΣ c=1 nΣαεVnρ c,α, denoted by ρ̄, satisfies ρ̄ ≥ 1/2, and the equality holds if and only if ρc,α satisfies ρc,α = 1/2 for every cheating vector δc and every original vector α. In this case the secret sharing is said to be cheating immune. We further establish a relationship between cheating-immune secret sharing and cryptographic criteria of boolean functions. This enables us to construct cheating-immune secret sharing.

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On cheating immune secret sharing

Abstract

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