Construction of self-dual codes over $\mathbb{Z}_{2^m}$

TL;DR

This paper develops methods to construct self-dual codes over the ring ^m, explores their weight enumerators, and connects these codes to Jacobi forms, advancing the understanding of their algebraic and modular properties.

Contribution

It introduces new constructions of self-dual codes over ^m using shadows and generalized shadows, and relates these codes to Jacobi forms on the modular group.

Findings

Constructed higher length self-dual codes over ^m from shadows.

Determined complete weight enumerators for these codes.

Connected code constructions to Jacobi forms on SL(2,).

Abstract

Self-dual codes (Type I and Type II codes) play an important role in the construction of even unimodular lattices, and hence in the determination of Jacobi forms. In this paper, we construct both Type I and Type II codes (of higher lengths) over the ring $\mathbb{Z}_{2^m}$ of integers modulo $2^m$ from shadows of Type I codes of length $n$ over $\mathbb{Z}_{2^m}$ for each positive integer $n;$ and obtain their complete weight enumerators. Using these results, we also determine some Jacobi forms on the modular group $\Gamma(1) = SL(2; \mathbb{Z}).$ Besides this, for each positive integer $n$; we also construct self-dual codes (of higher lengths) over $\mathbb{Z}_{2^m}$ from the generalized shadow of a self-dual code $\mathcal{C}$ of length $n$ over $\mathbb{Z}_{2^m}$ with respect to a vector $s\in \mathbb{Z}_{2^m}^n\setminus \mathcal{C}$ satisfying either $s\cdot s \equiv 0 (mod 2^m)$ or $s\cdot s \equiv 2^{m-1} (mod 2^m).$