English

On symmetric partial differential operators

Algebraic Geometry 2019-11-22 v1 Complex Variables

Abstract

Let s 1 ,. .. , s k be the elementary symmetric functions of the complex variables x 1 ,. .. , x k. We say that F \in C[s 1 ,. .. , s k ] is a trace function if their exists f \in C[z] such that F (s 1 ,. .. , s k ] = k j=1 f (x j) for all s \in C k. We give an explicit finite family of second order differential operators in the Weyl algebra W 2 := C[s 1 ,. .. , s k ] \partial \partials 1 ,. .. , \partial \partials k which generates the left ideal in W 2 of partial differential operators killing all trace functions. The proof uses a theorem for symmetric differential operators analogous to the usual symmetric functions theorem and the corresponding map for symbols. As a corollary, we obtain for each integer k a holonomic system which is a quotient of W 2 by an explicit left ideal whose local solutions are linear combinations of the branches of the multivalued root of the universal equation of degree k: z k + k h=1 (--1) h .s h .z k--h = 0.

Keywords

Cite

@article{arxiv.1911.09347,
  title  = {On symmetric partial differential operators},
  author = {Daniel Barlet},
  journal= {arXiv preprint arXiv:1911.09347},
  year   = {2019}
}
R2 v1 2026-06-23T12:23:07.830Z