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Divisibility of Trace Codes

Combinatorics 2026-05-20 v1 Information Theory math.IT

Abstract

A linear code is said to be Δ\Delta-divisible if the Hamming weights of all its codewords are divisible by Δ\Delta. The pp-adic valuation of a code is defined as the greatest integer tt such that the code is ptp^t-divisible. In this paper, we establish a divisibility criterion for trace codes. Specifically, this criterion provides a systematic method to determine the pp-adic valuation of the associated trace code, thereby extending Ward's classical divisibility criterion from standard generating sets (or matrices) to generalized generator matrices over an extension field. Furthermore, we present two applications of our framework. The first application provides a concise proof of the celebrated divisibility results on abelian codes established by Delsarte and McEliece. The second application establishes several explicit lower bounds on the pp-adic valuation of the number of solutions over Fqm\mathbb{F}_{q^m} (where q=peq = p^e) to the Artin-Schreier type equation f(x1,,xk)=yqy f(x_1,\ldots,x_k)=y^q-y . In particular, under the condition (d,qm1q1)=1\left(d,\frac{q^m-1}{q-1}\right)=1, we determine the exact minimum pp-adic valuation of the number of solutions when ff is restricted to homogeneous polynomials of degree dd.

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Cite

@article{arxiv.2605.19857,
  title  = {Divisibility of Trace Codes},
  author = {Hexiang Huang and Haihua Deng and Sihuang Hu},
  journal= {arXiv preprint arXiv:2605.19857},
  year   = {2026}
}

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21 pages