Limit theorems for the generator of a symmetric Levy process with the delta potential

Abstract: We consider a one-dimensional symmetric Levy process that has local time. In the first part, we construct a self-adjoint extension of the generator of the process so that the constructed operator corresponds to the generator with the delta potential. Using the constructed operator, we extend the Feynman-Kac formula to the case of delta function-type potentials and prove a limit theorem for an operator semigroup corresponding to this formula. In the second part, we construct a one-parameter family of distributions that attract the sample paths of the process to a given point. We show that this family weakly converges to the distribution of a Feller process and prove a limit theorem for the distribution of a point where an attracted sample path comes.