Log-Concave Sequences in Coding Theory

Abstract

We introduce the notion of logarithmically concave (or log-concave) sequences in Coding Theory. A sequence a0, a1, …, an of real numbers is called log-concave if ai2 ai-1ai+1 for all 1 i n-1. A natural sequence of positive numbers in coding theory is the weight distribution of a linear code consisting of the nonzero values among Ai's where Ai denotes the number of codewords of weight i. We call a linear code log-concave if its nonzero weight distribution is log-concave. Our main contribution is to show that all binary general Hamming codes of length 2r -1 (r=3 or r 5), the binary extended Hamming codes of length 2r ~(r 3), and the second order Reed-Muller codes R(2, m)~ (m 2) are all log-concave while the homogeneous and projective second order Reed-Muller codes are either log-concave, or 1-gap log-concave. Furthermore, we show that any MDS [n, k] code over Fq satisfying 3 ≤slant k ≤slant n/2 +3 is log-concave if q ≥slant q0(n, k) which is the larger root of a quadratic polynomial. Hence, we expect that the concept of log-concavity in coding theory will stimulate many interesting problems.

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