A generalisation of bent vectors for Butson Hadamard matrices
Abstract
An n× n complex matrix M with entries in the kth roots of unity which satisfies MM = nIn is called a Butson Hadamard matrix. While a matrix with entries in the kth roots typically does not have an eigenvector with entries in the same set, such vectors and their generalisations turn out to have multiple applications. A bent vector for M satisfies M x = λ y where x has entries in the kth roots of unity and all entries of y are complex numbers of norm 1. Such a bent vector x is self-dual if y = μ x and conjugate self-dual if y = μ x for some μ of norm 1. Using techniques from algebraic number theory, we prove some order conditions and non-existence results for self-dual and conjugate self-dual bent vectors; using tensor constructions and Bush-type matrices we give explicit examples. We conclude with an application to the covering radius of certain non-linear codes generalising the Reed Muller codes.
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