On dynamic threshold schemes
1994; Elsevier BV; Volume: 52; Issue: 4 Linguagem: Inglês
10.1016/0020-0190(94)90127-9
ISSN1872-6119
AutoresHung‐Min Sun, Shiuh‐Pyng Shieh,
Tópico(s)Chaos-based Image/Signal Encryption
ResumoAn (m, n) threshold scheme is to decompose the master key K into n secret shadows in such a way that the master key K cannot be reclaimed unless any m shadows are collected. However, any m − 1 or fewer shadows provide absolutely no information about K. In 1989, Laih et al. proposed the concept of dynamic threshold schemes which allow the master key to be updated without changing the secret shadows. However, the perfect dynamic threshold scheme, which provides perfect secrecy though the master key is allowed to be changed, has not been proposed. Nor has any paper shown the existence of perfect dynamic threshold schemes. In this paper, we prove that perfect dynamic threshold schemes do not exist when their master keys need be updated ⌊log2|S|log2|K|⌋ times or more without changing the secret shadows, where S is the secret shadow space and K is the master key space. Furthermore, we propose an perfect dynamic threshold scheme which allows its master key to be updated once without changing the secret shadows.
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