Criticality transition for positive powers of the discrete Laplacian on the half line

Abstract

We study the criticality and subcriticality of powers (-)α with α>0 of the discrete Laplacian - acting on 2(N). We prove that these positive powers of the Laplacian are critical if and only if α 3/2. We complement our analysis with Hardy type inequalities for (-)α in the subcritical regimes α ∈ (0,3/2). As an illustration of the critical case, we describe the negative eigenvalues emerging by coupling the discrete bilaplacian with an arbitrarily small localized potential.