English

On the Deligne-Simpson problem

Algebraic Geometry 2007-05-23 v1 Rings and Algebras Representation Theory

Abstract

The Deligne-Simpson problem is formulated like this: give necessary and sufficient conditions for the choice of the conjugacy classes CjSL(n,C)C_j\subset SL(n,{\bf C}) or cjsl(n,C)c_j\subset sl(n,{\bf C}) so that there exist irreducible (p+1)(p+1)-tuples of matrices MjCjM_j\in C_j or AjcjA_j\in c_j satisfying the equality M1...Mp+1=IM_1... M_{p+1}=I or A1+...+Ap+1=0A_1+... +A_{p+1}=0. We solve the problem for generic eigenvalues with the exception of the case of matrices MjM_j when the greatest common divisor of the numbers Σj,l(σ)\Sigma_{j,l}(\sigma) of Jordan blocks of a given matrix MjM_j, with a given eigenvalue σ\sigma and of a given size ll (taken over all jj, σ\sigma, ll) is >1>1. Generic eigenvalues are defined by explicit algebraic inequalities. For such eigenvalues there exist no reducible (p+1)(p+1)-tuples. The matrices MjM_j and AjA_j are interpreted as monodromy operators of regular linear systems and as matrices-residua of fuchsian ones on Riemann's sphere.

Keywords

Cite

@article{arxiv.math/0011013,
  title  = {On the Deligne-Simpson problem},
  author = {Vladimir Petrov Kostov},
  journal= {arXiv preprint arXiv:math/0011013},
  year   = {2007}
}