On Hilbert-Poincar\'e series of affine semi-regular polynomial sequences and related Gr\"obner bases

Abstract

Gr\"obner bases are nowadays central tools for solving various problems in commutative algebra and algebraic geometry. A typical use of Gr\"obner bases is the multivariate polynomial system solving, which enables us to construct algebraic attacks against post-quantum cryptographic protocols. Therefore, the determination of the complexity of computing Gr\"obner bases is very important both in theory and in practice: One of the most important cases is the case where input polynomials compose an (overdetermined) affine semi-regular sequence. The first part of this paper aims to present a survey on Gr\"obner basis computation and its complexity. In the second part, we shall give an explicit formula on the (truncated) Hilbert-Poincar\'e series associated to the homogenization of an affine semi-regular sequence. Based on the formula, we also study (reduced) Gr\"obner bases of the ideals generated by an affine semi-regular sequence and its homogenization. Some of our results are considered to give mathematically rigorous proofs of the correctness of methods for computing Gr\"obner bases of the ideal generated by an affine semi-regular sequence.