Characterization of non-special divisors of small degree on Kummer extensions and LCP codes

Abstract

A recent construction of linear complementary pairs (LCPs) of algebraic geometry codes is intimately linked to the identification of non-special divisors of small degree within a function field over a finite field. Let Fq be the finite field of cardinality q. In this work, we consider a function field F/Fq of genus g defined by a Kummer extension of type ym = f(x), where f(x) is a polynomial in Fq[x]. Based on the theory of generalized Weierstrass semigroups at several places, we provide an arithmetic criterion to identify all non-special divisors of degree g-1 and g whose support is contained in a subset of the totally ramified places of the extension F/Fq(x). Furthermore, we explicitly determine all non-special divisors of degree g-1 in certain cases. Finally, we apply these results to provide explicit new families of LCPs algebraic geometry codes.