Symmetry-enriched topological order and quasifractonic behavior in $\mathbb{Z}_N$ stabilizer codes

TL;DR

This paper explores $ abla$Z_N stabilizer codes, revealing their topological properties depend on prime factors, and introduces algebraic methods to analyze anyon fusion and quasifractonic behavior.

Contribution

It generalizes the understanding of $ abla$Z_N codes by linking their properties to prime components and develops algebraic tools for analyzing topological and SET order.

Findings

Topological properties of $ abla$Z_N codes are determined by their $ abla$Z_p counterparts.

Provides a method to compute anyon fusion rules using algebraic geometry.

Elucidates the SET order underlying quasifractonic behavior in these codes.

Abstract

We study a broad class of qudit stabilizer codes, termed $\mathbb{Z}_N$ bivariate-bicycle (BB) codes, arising either as two-dimensional realizations of modulated gauge theories or as $\mathbb{Z}_N$ generalizations of binary BB codes. Our central finding, derived from the polynomial representation, is that the essential topological properties of these $\mathbb{Z}_N$ codes can be determined by the properties of their $\mathbb{Z}_p$ counterparts, where $p$ are the prime factors of $N$, even when $N$ contains prime powers ($N = \prod_i p_i^{k_i}$). This result yields a significant simplification by leveraging the well-studied framework of codes with prime qudit dimensions. In particular, this insight directly enables the generalization of the algebraic-geometric methods (e.g., the Bernstein-Khovanskii-Kushnirenko theorem) to determine anyon fusion rules in the general qudit situation. Moreover, we elucidate the symmetry-enriched topological (SET) order underlying the quasifractonic behavior in qudit BB codes (including the Delfino-Chamon-You model), resolving the associated anyon mobility puzzle. We also develop an efficient computational algebraic method, based on Gr\"{o}bner bases over the ring of integers, to determine both the topological order and its SET properties.