On point-like interaction of three particles: two fermions and another particle. II

Abstract

This work continues bib1 where the construction of Hamiltonian H for the system of three quantum particles is considered. Namely the system consists of two fermions with mass 1 and another particle with mass m>0. In the present paper, like in bib1, we study the part Tl=1 of auxilliary operator T = l=0∞ Tl involving the construction of the resolvent for the operator H. In this work together with the previous one two constants 0<m1<m0<∞ were found such that: 1) for m>m0 the operator Tl=1 is selfadjoint but for m ≤slant m0 it has the deficiency indexes (1,1); 2) for m1<m<m0 any selfadjoint extension of Tl=1 is semibounded below; 3) for 0<m<m1 any selfadjoint extension of Tl=1 has the sequence of eigenvalues \λn <0, n> n0\ with the asymptotics \[ λn = λ0 eδ n + O(1), n∞, \] where λ0 <0, δ >0, n0>0 and there is'nt other spectrum on the interval λ < λn0.