Abstract
In this letter, we show that the family of progressive edge growth interleavers ensures optimal growth of the minimum distance of turbo codes, which grows as log(N), where N is the interleaver size. This family of interleavers fits well the self-concatenated structure of turbo codes, hence it works with irregular turbo codes as well. We will start by introducing the self-concatenated structure of turbo codes. We then recall the progressive edge-growth interleaver construction, and we show that the minimum distance grows optimally with such interleavers. We end up by showing simulation comparisons with other families of interleavers.
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