On q-deformed Markov numbers. Cohn matrices and perfect matchings with weighted edges

Abstract

We consider a natural q-deformation of the classical Markov numbers. This q-deformation is closely related to q-deformed rational numbers recently introduced by two of us. Both notions, those of q-rationals and q-Markov numbers, are based on invariance with respect to the action of the modular group mathrmPSL(2,Z). We prove that every Markov number has a unique q-deformation, which is a monic unimodal palindromic Laurent polynomial with positive integer coefficients. The q-Markov numbers can be calculated in terms of the traces of q-deformed Cohn matrices, and we show that q-Markov numbers are independent of the choice of such matrices. We construct a combinatorial model counting perfect matchings of snake graphs with weighted edges.