The Minimal Binomial Multiples of Polynomials over Finite Fields
Abstract
Let f(X) be a nonconstant polynomial over Fq, with a nonzero constant term. The order of f(X) is a classical notion in the theory of polynomials over finite fields, and recently the definition of freeness of binomials of f(X) was given in Mart\'inez. Generalizing these two notions, we introduce the definition of the minimal binomial multiple of f(X) in this paper, which is the monic binomial with the lowest degree among the binomials over Fq divided by f(X). Based on the equivalent characterization of binomials via the defining sets of their radicals, we prove that a series of properties of the classical order can be naturally generalized to this case. In particular, the minimal binomial multiple of f(X) is presented explicitly in terms of the defining set of the radical of f(X). And a criterion for f(X) being free of binomials is given. As an application, for any positive integer N and nonzero element λ in Fq, the λ-constacyclic codes of length N with minimal distance 2 are determined.
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