Darboux solutions of non-abelian quantum Painlev\'e II equation in terms of quasideterminants

Abstract

In this article non-abelian version of quantum Painlev\'e II equation is presented with Its quasideterminant solutions has been derived by using the Darboux transformations. This non-abelian quantum Painlev\'e II equation may be considered as a specific case of its purely noncommutatie analogue presented by V. Retakh and V. Rubtsov . In these computations the quantum Painlev\'e II symmetric form with commutation relations presented by H. Nagoya are applied to derive Nonabelian quantum Painlev\'e II equation and a new commutation relation between variable z and the solution f(z) such as z f - f z = 12 i f is presented. Finally, the Darboux solutions of that system are generalized to the N-th form in terms of quasideterminants.