Article
Ufa Mathematical Journal
Volume 11, Number 4, pp. 140-150
Threshold phenomenon for a family of the generalized
Friedrichs models with the perturbation of rank one
Lakaev S.N., Darus M., Dustov S.T.
DOI:10.13108/2019-11-4-140
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Article on MathNetAbstact
In this work we consider a family
Hμ(p), μ>0, p∈T3, of the generalized
Friedrichs models with the perturbation of rank one. This system describes a
system of two particles moving on the three dimensional lattice
Z3 and interacting via a pair of local repulsive
potentials. One of the reasons to consider such family
of the generalized Friedrichs models is that this family generalizes and involves some important behaviors
of the Hamiltonians for systems of both bosons and fermions on
lattices. In the work, we study the existence or absence of the
eigenvalues of the operator Hμ(p) located outside the essential
spectrum depending on the values of μ>0 and p∈Uδ(p0)⊂T3. We prove a analytic dependence on the parameters for such
eigenvalue and an associated eigenfunction and the latter is found in a certain explicit form. We prove the existence of
coupling constant threshold μ=μ(p)>0 for the operator
Hμ(p), p∈Uδ(p0), namely, we show that the operator Hμ(p)
has no eigenvalue for all 0<μ<μ(p) and there exists a unique
eigenvalue z(μ,p) for each μ>μ(p) and this eigenvalue is located above the
threshold z=M(p). We find necessary and sufficient conditions
allowing us to determine whether the threshold z=M(p) is an eigenvalue or
a virtual level or a regular point in the essential spectrum of
the operator Hμ(p), p∈Uδ(p0).