The Isometry-Dual Property in Flags of Two-Point Algebraic Geometry Codes

Abstract

A flag of codes C0 ⊂neq C1 ⊂neq ·s ⊂neq Cs ⊂eq Fqn is said to satisfy the isometry-dual property if there exists x∈ (Fq*)n such that the code Ci is x-isometric to the dual code Cs-i for all i=0,…, s. For P and Q rational places in a function field F, we investigate the existence of isometry-dual flags of codes in the families of two-point algebraic geometry codes C L(D, a0P+bQ)⊂neq C L(D, a1P+bQ)⊂neq … ⊂neq C L(D, asP+bQ), where the divisor D is the sum of pairwise different rational places of F and P, Q are not in supp(D). We characterize those sequences in terms of b for general function fields. We then apply the result to the broad class of Kummer extensions F defined by affine equations of the form ym=f(x), for f(x) a separable polynomial of degree r, where gcd(r, m)=1. For P the rational place at infinity and Q the rational place associated to one of the roots of f(x), it is shown that the flag of two-point algebraic geometry codes has the isometry-dual property if and only if m divides 2b+1. At the end we illustrate our results by applying them to two-point codes over several well know function fields.