Polar Codes' Simplicity, Random Codes' Durability

Abstract

Over any discrete memoryless channel, we build codes such that: for one, their block error probabilities and code rates scale like random codes'; and for two, their encoding and decoding complexities scale like polar codes'. Quantitatively, for any constants π,>0 such that π+2<1, we construct a sequence of error correction codes with block length N approaching infinity, block error probability (-Nπ), code rate N- less than the Shannon capacity, and encoding and decoding complexity O(N N) per code block. The putative codes take uniform -ary messages for sender's choice of prime . The putative codes are optimal in the following manner: Should π+2>1, no such codes exist for generic channels regardless of alphabet and complexity.