Solving large linear algebraic systems in the context of integrable non-abelian Laurent ODEs
arXiv:1109.2785
Abstract
The paper reports on a computer algebra program LSSS (Linear Selective Systems Solver) for solving linear algebraic systems with rational coefficients. The program is especially efficient for very large sparse systems that have a solution in which many variables take the value zero. The program is applied to the symmetry investigation of a non-abelian Laurent ODE introduced recently by M. Kontsevich. The computed symmetries confirmed that a Lax pair found for this system earlier generates all first integrals of degree at least up to 14.
15 pages, talk given at AMMCS 2011, submitted for publication in Programming and Computer Software