English

Noncommutative integrability, paths and quasi-determinants

Mathematical Physics 2011-06-07 v2 Combinatorics math.MP Quantum Algebra

Abstract

In previous work, we showed that the solution of certain systems of discrete integrable equations, notably QQ and TT-systems, is given in terms of partition functions of positively weighted paths, thereby proving the positive Laurent phenomenon of Fomin and Zelevinsky for these cases. This method of solution is amenable to generalization to non-commutative weighted paths. Under certain circumstances, these describe solutions of discrete evolution equations in non-commutative variables: Examples are the corresponding quantum cluster algebras [BZ], the Kontsevich evolution [DFK09b] and the TT-systems themselves [DFK09a]. In this paper, we formulate certain non-commutative integrable evolutions by considering paths with non-commutative weights, together with an evolution of the weights that reduces to cluster algebra mutations in the commutative limit. The general weights are expressed as Laurent monomials of quasi-determinants of path partition functions, allowing for a non-commutative version of the positive Laurent phenomenon. We apply this construction to the known systems, and obtain Laurent positivity results for their solutions in terms of initial data.

Keywords

Cite

@article{arxiv.1006.4774,
  title  = {Noncommutative integrability, paths and quasi-determinants},
  author = {Philippe Di Francesco and Rinat Kedem},
  journal= {arXiv preprint arXiv:1006.4774},
  year   = {2011}
}

Comments

46 pages, minor typos corrected

R2 v1 2026-06-21T15:40:31.257Z