A new bound for the capacity of the deletion channel with high deletion probabilities

Abstract

Let C(d) be the capacity of the binary deletion channel with deletion probability d. It was proved by Drinea and Mitzenmacher that, for all d, C(d)/(1-d)≥ 0.1185 . Fertonani and Duman recently showed that d 1C(d)/(1-d)≤ 0.49. In this paper, it is proved that d 1C(d)/(1-d) exists and is equal to ∈fdC(d)/(1-d). This result suggests the conjecture that the curve C(d) my be convex in the interval d∈ [0,1]. Furthermore, using currently known bounds for C(d), it leads to the upper bound d 1C(d)/(1-d)≤ 0.4143.