A non-commutative discrete first Painlevé hierarchy: the Lax pair approach

Abstract

Using a non-commutative analogue of the isomonodromic problem associated with the discrete first Painlevé hierarchy, we construct a non-commutative version of this hierarchy, denoted by d-PImnc. We show that both hierarchies, d-PIm and d-PImnc, can be expressed in terms of the polynomials Ssk(n), which we call the Svinin polynomials. We also derive a reduction of the non-commutative Volterra lattice hierarchy to the d-PImnc hierarchy and present explicit continuous limits for the first three members of the d-PImnc, thereby recovering non-commutative analogues of the first three members of the differential first Painlevé hierarchy.