Mismatched Guesswork

Abstract

We study the problem of mismatched guesswork, where we evaluate the number of symbols y ∈ Y which have higher likelihood than X μ according to a mismatched distribution . We discuss the role of the tilted/exponential families of the source distribution μ and of the mismatched distribution . We show that the value of guesswork can be characterized using the tilted family of the mismatched distribution , while the probability of guessing is characterized by an exponential family which passes through μ. Using this characterization, we demonstrate that the mismatched guesswork follows a large deviation principle (LDP), where the rate function is described implicitly using information theoretic quantities. We apply these results to one-to-one source coding (without prefix free constraint) to obtain the cost of mismatch in terms of average codeword length. We show that the cost of mismatch in one-to-one codes is no larger than that of the prefix-free codes, i.e., D(μ\| ). Further, the cost of mismatch vanishes if and only if lies on the tilted family of the true distribution μ, which is in stark contrast to the prefix-free codes. These results imply that one-to-one codes are inherently more robust to mismatch.