English

Mismatched Decoding: Error Exponents, Second-Order Rates and Saddlepoint Approximations

Information Theory 2014-03-05 v3 math.IT

Abstract

This paper considers the problem of channel coding with a given (possibly suboptimal) maximum-metric decoding rule. A cost-constrained random-coding ensemble with multiple auxiliary costs is introduced, and is shown to achieve error exponents and second-order coding rates matching those of constant-composition random coding, while being directly applicable to channels with infinite or continuous alphabets. The number of auxiliary costs required to match the error exponents and second-order rates of constant-composition coding is studied, and is shown to be at most two. For i.i.d. random coding, asymptotic estimates of two well-known non-asymptotic bounds are given using saddlepoint approximations. Each expression is shown to characterize the asymptotic behavior of the corresponding random-coding bound at both fixed and varying rates, thus unifying the regimes characterized by error exponents, second-order rates and moderate deviations. For fixed rates, novel exact asymptotics expressions are obtained to within a multiplicative 1+o(1) term. Using numerical examples, it is shown that the saddlepoint approximations are highly accurate even at short block lengths.

Keywords

Cite

@article{arxiv.1303.6166,
  title  = {Mismatched Decoding: Error Exponents, Second-Order Rates and Saddlepoint Approximations},
  author = {Jonathan Scarlett and Alfonso Martinez and Albert Guillén i Fàbregas},
  journal= {arXiv preprint arXiv:1303.6166},
  year   = {2014}
}

Comments

Accepted to IEEE Transactions on Information Theory. (v2) Major revisions made, Saddlepoint Approximation section extended significantly, title changed (v3) Final version uploaded

R2 v1 2026-06-21T23:47:46.239Z