Polar codes with a stepped boundary

Abstract

We consider explicit polar constructions of blocklength n→∞ for the two extreme cases of code rates R→1 and R→0. For code rates R→1, we design codes with complexity order of n n in code construction, encoding, and decoding. These codes achieve the vanishing output bit error rates on the binary symmetric channels with any transition error probability p→ 0 and perform this task with a substantially smaller redundancy (1-R)n than do other known high-rate codes, such as BCH codes or Reed-Muller (RM). We then extend our design to the low-rate codes that achieve the vanishing output error rates with the same complexity order of n n and an asymptotically optimal code rate R→0 for the case of p→1/2.