On domain properties of Bessel-type operators

Abstract

Motivated by a recent study of Bessel operators in connection with a refinement of Hardy's inequality involving 1/2(x) on the finite interval (0,π), we now take a closer look at the underlying Bessel-type operators with more general inverse square singularities at the interval endpoints. More precisely, we consider quadratic forms and operator realizations in L2((a,b); dx) associated with differential expressions of the form \[ ωsa = - d2dx2 + sa2 - (1/4)(x-a)2, sa ∈ R, \; x ∈ (a,b), \] and align* τsa,sb = - d2dx2 + sa2 - (1/4)(x-a)2 + sb2 - (1/4)(x-b)2 + q(x), x ∈ (a,b),& \\ sa, sb ∈ [0,∞), \; q ∈ L∞((a,b); dx), \; q real-valued~a.e.~on (a,b),& align* where (a,b) ⊂ R is a bounded interval. As an explicit illustration we describe the Krein-von Neumann extension of the minimal operator corresponding ωsa and τsa,sb.