The Intersection Structure of Bernstein-Sato Ideals
Published: Sep 11, 2025
Last Updated: Sep 11, 2025
Authors:Lei Wu
Abstract
By using logarithmic $\mathcal D$-modules and Gr\"obner bases, we prove that Bernstein-Sato ideals satisfy some symmetric intersection property, answering a question posed by Budur. As an application, we obtain a formula for the Bernstein-Sato polynomials of $f^n$, the integer powers of a multi-variable polynomial $f$.