On Linear Codes with Random Multiplier Vectors and the Maximum Trace Dimension Property

TL;DR

This paper investigates the probability that random multiplier vectors produce linear codes with maximum trace dimension, providing bounds and interpretations relevant for cryptographic applications and algebraic geometry codes.

Contribution

It derives a lower bound for the probability of maximum trace dimension in codes generated by random multipliers, linking it to algebraic geometry and matrix rank probabilities.

Findings

Lower bound for probability of maximum trace dimension

Connection between trace dimension and algebraic geometry divisor degree

Numerical evidence linking maximum trace dimension probability to full rank matrices

Abstract

Let $C$ be a linear code of length $n$ and dimension $k$ over the finite field $\mathbb{F}_{q^m}$. The trace code $\mathrm{Tr}(C)$ is a linear code of the same length $n$ over the subfield $\mathbb{F}_q$. The obvious upper bound for the dimension of the trace code over $\mathbb{F}_q$ is $mk$. If equality holds, then we say that $C$ has maximum trace dimension. The problem of finding the true dimension of trace codes and their duals is relevant for the size of the public key of various code-based cryptographic protocols. Let $C_{\mathbf{a}}$ denote the code obtained from $C$ and a multiplier vector $\mathbf{a}\in (\mathbb{F}_{q^m})^n$. In this paper, we give a lower bound for the probability that a random multiplier vector produces a code $C_{\mathbf{a}}$ of maximum trace dimension. We give an interpretation of the bound for the class of algebraic geometry codes in terms of the degree of the defining divisor. The bound explains the experimental fact that random alternant codes have minimal dimension. Our bound holds whenever $n\geq m(k+h)$, where $h\geq 0$ is the Singleton defect of $C$. For the extremal case $n=m(h+k)$, numerical experiments reveal a closed connection between the probability of having maximum trace dimension and the probability that a random matrix has full rank.