Some remarks on boundary operators of Bessel extensions

Abstract

In this paper we study some boundary operators of a class of Bessel-type Littlewood-Paley extensions whose prototype is \[x u(x,y) +1-2sy ∂ u∂ y(x,y)+∂2 u∂ y2(x,y)=0 for x∈Rd, y>0, \\ u(x,0)=f(x) for x∈Rd. \] In particular, we show that with a logarithmic scaling one can capture the failure of analyticity of these extensions in the limiting cases s=k ∈ N.