Projection methods for discrete Schrodinger operators
Abstract
Let H be the discrete Schr\"odinger operator Hu(n):=u(n-1)+u(n+1)+v(n)u(n), u(0)=0 acting on l2( Z+) where the potential v is real-valued and v(n) 0 as n ∞. Let P be the orthogonal projection onto a closed linear subspace L ⊂ l2( Z+). In a recent paper E.B. Davies defines the second order spectrum Spec2(H,L) of H relative to L as the set of z ∈ C such that the restriction to L of the operator P(H-z)2P is not invertible within the space L. The purpose of this article is to investigate properties of Spec2(H,L) when L is large but finite dimensional. We explore in particular the connection between this set and the spectrum of H. Our main result provides sharp bounds in terms of the potential v for the asymptotic behaviour of Spec2(H,L) as L increases towards l2( Z+).
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