The processing of ML-KEM (formerly CRYSTALS-Kyber), a key encapsulation mechanism with post-quantum security, is performed by multiplication, addition, and subtraction of polynomials whose coefficients lie in the finite field ${\mathbb F}_{3329}$. To reduce the number of such operations, it is common to use the Number Theoretic Transform (NTT). This paper focuses on arithmetic over ${\mathbb F}_{3329}$ and proposes the use of a logarithmic representation with respect to a primitive element $\alpha$ of ${\mathbb F}_{3329}^*$ for implementing multiplication, addition, and subtraction over ${\mathbb F}_{3329}$. In this representation, multiplication in ${\mathbb F}_{3329}^*$ can be reduced to addition in $\mathbb{Z}_{3328}$. Furthermore, addition and subtraction in ${\mathbb F}_{3329}^*$ can be computed in the logarithmic domain by using Zech's logarithm. However, special treatment is required when $0 \in {\mathbb F}_{3329}$ is involved in the operations. This paper proposes a new implementation method of the logarithmic representation for arithmetic over ${\mathbb F}_{3329}$, including the handling of such exceptional cases.
BibTeX
@misc{cryptoeprint:2026/432,
author = {Masaaki Shirase},
title = {Finite Field Arithmetic for {ML}-{KEM} Using Zech's Logarithm},
howpublished = {Cryptology {ePrint} Archive, Paper 2026/432},
year = {2026},
url = {https://eprint.iacr.org/2026/432}
}
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