Abstract

We study the performance of generalized polar (GP) codes when they are used for coding schemes involving erasure. GP codes are a family of codes which contains, among others, the standard polar codes of Arikan and Reed-Muller codes. We derive a closed formula for the zero-undetected-error capacity I_0^{Gp}(W) of GP codes for a given binary memoryless symmetric (BMS) channel W under the low complexity successive cancellation decoder with erasure. We show that for every R < I_0^{GP}(W), there exists a generalized polar code of blocklength N and of rate at least R where the undetected-error probability is zero and the erasure probability is less than 2^(-N^(1/ 2-epsilon)). On the other hand, for any GP code of rate I_0^{GP}(W) (W) < R < I (W) and blocklength N, the undetected error probability cannot be made less than 2^(-N^(1/ 2+epsilon)) unless the erasure probability is close to 1.

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