Self-orthogonal flags of codes and translation of flags of algebraic geometry codes

Abstract

A flag C0 ⊂neq C1 ·s ⊂neq Cs ⊂neq Fqn of linear codes is said to be self-orthogonal if the duals of the codes in the flag satisfy Ci=Cs-i, and it is said to satisfy the isometry-dual property with respect to an isometry vector x if Ci= x Cs-i for i=1, …, s. We characterize complete (i.e. s=n) flags with the isometry-dual property by means of the existence of a word with non-zero coordinates in a certain linear subspace of Fqn. For flags of algebraic geometry (AG) codes we prove a so-called translation property of isometry-dual flags and give a construction of complete self-orthogonal flags, providing examples of self-orthogonal flags over some maximal function fields. At the end we characterize the divisors giving the isometry-dual property and the related isometry vectors showing that for each function field there is only a finite number of isometry vectors and that they are related by cyclic repetitions.