English

Universal Randomized Guessing Subjected to Distortion

Information Theory 2021-12-28 v1 Cryptography and Security Distributed, Parallel, and Cluster Computing math.IT

Abstract

In this paper, we consider the problem of guessing a sequence subject to a distortion constraint. Specifically, we assume the following game between Alice and Bob: Alice has a sequence \bx\bx of length nn. Bob wishes to guess \bx\bx, yet he is satisfied with finding any sequence \bx^\hat{\bx} which is within a given distortion DD from \bx\bx. Thus, he successively submits queries to Alice, until receiving an affirmative answer, stating that his guess was within the required distortion. Finding guessing strategies which minimize the number of guesses (the \emph{guesswork}), and analyzing its properties (e.g., its ρ\rho--th moment) has several applications in information security, source and channel coding. Guessing subject to a distortion constraint is especially useful when considering contemporary biometrically--secured systems, where the "password" which protects the data is not a single, fixed vector but rather a \emph{ball of feature vectors} centered at some \bx\bx, and any feature vector within the ball results in acceptance. We formally define the guessing problem under distortion in \emph{four different setups}: memoryless sources, guessing through a noisy channel, sources with memory and individual sequences. We suggest a randomized guessing strategy which is asymptotically optimal for all setups and is \emph{five--fold universal}, as it is independent of the source statistics, the channel, the moment to be optimized, the distortion measure and the distortion level.

Keywords

Cite

@article{arxiv.2112.13594,
  title  = {Universal Randomized Guessing Subjected to Distortion},
  author = {Asaf Cohen and Neri Merhav},
  journal= {arXiv preprint arXiv:2112.13594},
  year   = {2021}
}

Comments

Submitted to IEEE Transactions on Information Theory

R2 v1 2026-06-24T08:32:22.174Z