LP decoding of expander codes: a simpler proof

Abstract

A code C ⊂eq 2n is a (c,ε,δ)-expander code if it has a Tanner graph, where every variable node has degree c, and every subset of variable nodes L0 such that |L0|≤ δ n has at least ε c |L0| neighbors. Feldman et al. (IEEE IT, 2007) proved that LP decoding corrects 3ε-22ε-1 · (δ n-1) errors of (c,ε,δ)-expander code, where ε > 2/3+13c. In this paper, we provide a simpler proof of their result and show that this result holds for every expansion parameter ε > 2/3.