Variational Estimates for Discrete Schr\"odinger Operators with Potentials of Indefinite Sign
Abstract
Let H be a one-dimensional discrete Schr\"odinger operator. We prove that if σ (H)⊂ [-2,2], then H-H0 is compact and σ(H)=[-2,2]. We also prove that if H0 + 14 V2 has at least one bound state, then the same is true for H0 +V. Further, if H0 + 14 V2 has infinitely many bound states, then so does H0 +V. Consequences include the fact that for decaying potential V with |n|∞ |nV(n)| > 1, H0 +V has infinitely many bound states; the signs of V are irrelevant. Higher-dimensional analogues are also discussed.
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