Symplectic Hulls over a Non-Unital Ring

Abstract

This paper presents the study of the symplectic hulls over a non-unital ring E= ,τ 2 =2 τ=0,~ 2=,~ τ2=τ,~ τ=,~ τ =τ . We first identify the residue and torsion codes of the left, right, and two-sided symplectic hulls, and characterize the generator matrix of the two-sided symplectic hull of a free E-linear code. Then, we explore the symplectic hull of the sum of two free E-linear codes. Subsequently, we provide two build-up techniques that extend a free E-linear code of smaller length and symplectic hull-rank to one of larger length and symplectic hull-rank. Further, for free E-linear codes, we discuss the permutation equivalence and investigate the symplectic hull-variation problem. An application of this study is given by classifying the free E-linear optimal codes for smaller lengths.