Ground state representation for the fractional Laplacian with Hardy potential in angular momentum channels
Abstract
Motivated by the study of relativistic atoms, we consider the Hardy operator (-)α/2-|x|-α acting on functions of the form u(|x|) |x| Y,m(x/|x|) in L2(Rd), when ≥0 and α∈(0,2](0,d+2). We give a ground state representation of the corresponding form on the half-line (Theorem 1.5). For the proof we use subordinated Bessel heat kernels.
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