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Random Matrices from Linear Codes and Wigner's Semicircle Law II

Published 30 Jun 2019 in math.PR | (1907.00323v3)

Abstract: Recently we considered a class of random matrices obtained by choosing distinct codewords at random from linear codes over finite fields and proved that under some natural algebraic conditions their empirical spectral distribution converges to Wigner's semicircle law as the length of the codes goes to infinity. One of the conditions is that the dual distance of the codes is at least 5. In this paper, employing more advanced techniques related to Stieltjes transform, we show that the dual distance being at least 5 is sufficient to ensure the convergence, and the convergence rate is of the form $n{-\beta}$ for some $0 < \beta < 1$, where $n$ is the length of the code.

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