Low energy effects for a family of Friedrichs models
Abstract
A family of Friedrichs models with rank one perturbations hμ(p), p ∈ (-π,π]3,μ>0 associated to a system of two particles on the lattice 3 is considered. The existence of a unique strictly positive eigenvalue below the bottom of the essential spectrum of hμ(p) for all nontrivial values p ∈ (-π,π]3 under the assumption that hμ(0) has either a zero energy resonance (virtual level) or a threshold eigenvalue is proved. Low energy asymptotic expansion for the Fredholm determinant associated to family of Friedrichs models is obtained.
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