Transmutations for Darboux transformed operators with applications

Abstract

We solve the following problem. Given a continuous complex-valued potential q1 defined on a segment [-a,a] and let q2 be the potential of a Darboux transformed Schr\"odinger operator. Suppose a transmutation operator T1 for the potential q1 is known such that the corresponding Schr\"odinger operator is transmuted into the operator of second derivative. Find an analogous transmutation operator T2 for the potential q2. It is well known that the transmutation operators can be realized in the form of Volterra integral operators with continuously differentiable kernels. Given a kernel K1 of the transmutation operator T1 we find the kernel K2 of T2 in a closed form in terms of K1. As a corollary interesting commutation relations between T1 and T2 are obtained which then are used in order to construct the transmutation operator for the one-dimensional Dirac system with a scalar potential.