Primary ideals and their differential equations
Commutative Algebra
2020-11-20 v3 Algebraic Geometry
Analysis of PDEs
Abstract
An ideal in a polynomial ring encodes a system of linear partial differential equations with constant coefficients. Primary decomposition organizes the solutions to the PDE. This paper develops a novel structure theory for primary ideals in a polynomial ring. We characterize primary ideals in terms of PDE, punctual Hilbert schemes, relative Weyl algebras, and the join construction. Solving the PDE described by a primary ideal amounts to computing Noetherian operators in the sense of Ehrenpreis and Palamodov. We develop new algorithms for this task, and we present efficient implementations.
Cite
@article{arxiv.2001.04700,
title = {Primary ideals and their differential equations},
author = {Yairon Cid-Ruiz and Roser Homs and Bernd Sturmfels},
journal= {arXiv preprint arXiv:2001.04700},
year = {2020}
}
Comments
32 pages. To appear in Foundations of Computational Mathematics