Schur-Sato theory for quasi-elliptic rings

TL;DR

This paper extends the Schur-Sato theory to arbitrary dimensions for quasi-elliptic rings, providing classification theorems and applications in algebraic geometry and integrable systems.

Contribution

It generalizes the Schur-Sato theory to higher dimensions and establishes classification theorems for quasi-elliptic rings using Schur pairs.

Findings

Classification of quasi-elliptic rings via Schur pairs

Effective algebraic-geometric description of these rings

New proof of the Abhyankar inversion formula

Abstract

The notion of quasi-elliptic rings appeared as a result of an attempt to classify a wide class of commutative rings of operators found in the theory of integrable systems, such as rings of commuting differential, difference, differential-difference, etc. operators. They are contained in a certain non-commutative "universal" ring - a purely algebraic analogue of the ring of pseudodifferential operators on a manifold, and admit (under certain mild restrictions) a convenient algebraic-geometric description. An important algebraic part of this description is the Schur-Sato theory - a generalisation of the well known theory for ordinary differential operators. Some parts of this theory were developed earlier in a series of papers, mostly for dimension two. In this paper we present this theory in arbitrary dimension. We apply this theory to prove two classification theorems of quasi-elliptic rings in terms of certain pairs of subspaces (Schur pairs). They are necessary for the algebraic-geometric description of quasi-elliptic rings mentioned above. The theory is effective and has several other applications, among them is a new proof of the Abhyankar inversion formula.