Asymptotics of resonances induced by point interactions

Abstract

We consider the resonances of the self-adjoint three-dimensional Schr\"odinger operator with point interactions of constant strength supported on the set X = \ xn \n=1N. The size of X is defined by VX = π∈N Σn=1N |xn - xπ(n)|, where N is the family of all the permutations of the set \1,2,…,N\. We prove that the number of resonances counted with multiplicities and lying inside the disc of radius R behaves asymptotically linear WXπ R + O(1) as R ∞, where the constant WX ∈ [0,VX] can be seen as the effective size of X. Moreover, we show that there exist configurations of any number of points such that WX = VX. Finally, we construct an example for N = 4 with WX < VX, which can be viewed as an analogue of a quantum graph with non-Weyl asymptotics of resonances.