On Two-Stage Guessing
Abstract
Stationary memoryless sources produce two correlated random sequences and . A guesser seeks to recover in two stages, by first guessing and then . The contributions of this work are twofold: (1) We characterize the least achievable exponential growth rate (in ) of any positive -th moment of the total number of guesses when is obtained by applying a deterministic function component-wise to . We prove that, depending on , the least exponential growth rate in the two-stage setup is lower than when guessing directly. We further propose a simple Huffman code-based construction of a function that is a viable candidate for the minimization of the least exponential growth rate in the two-stage guessing setup. (2) We characterize the least achievable exponential growth rate of the -th moment of the total number of guesses required to recover when Stage 1 need not end with a correct guess of and without assumptions on the stationary memoryless sources producing and .
Cite
@article{arxiv.2104.04586,
title = {On Two-Stage Guessing},
author = {Robert Graczyk and Igal Sason},
journal= {arXiv preprint arXiv:2104.04586},
year = {2021}
}
Comments
Citation for this work: R. Graczyk and I. Sason, "On two-stage guessing," Information, vol. 12, no. 4, paper 159, pp. 1 - 20, April 2021. The published version is available (Open Access) at the link: https://www.mdpi.com/2078-2489/12/4/159