Effective descent for differential operators
Algebraic Geometry
2010-01-05 v1 Classical Analysis and ODEs
Abstract
A theorem of N. Katz \cite{Ka} p.45, states that an irreducible differential operator over a suitable differential field , which has an isotypical decomposition over the algebraic closure of , is a tensor product of an absolutely irreducible operator over and an irreducible operator over having a finite differential Galois group. Using the existence of the tensor decomposition , an algorithm is given in \cite{C-W}, which computes an absolutely irreducible factor of over a finite extension of . Here, an algorithmic approach to finding and is given, based on the knowledge of . This involves a subtle descent problem for differential operators which can be solved for explicit differential fields which are -fields.
Cite
@article{arxiv.1001.0153,
title = {Effective descent for differential operators},
author = {Elie Compoint and Marius van der Put and Jacques-Arthur Weil},
journal= {arXiv preprint arXiv:1001.0153},
year = {2010}
}
Comments
21 pages