Time dependent delta-prime interactions in dimension one

Abstract

We solve the Cauchy problem for the Schr\"odinger equation corresponding to the family of Hamiltonians Hγ(t) in L2(R) which describes a δ'-interaction with time-dependent strength 1/γ(t). We prove that the strong solution of such a Cauchy problem exits whenever the map tγ(t) belongs to the fractional Sobolev space H3/4(R), thus weakening the hypotheses which would be required by the known general abstract results. The solution is expressed in terms of the free evolution and the solution of a Volterra integral equation.