Extension technique for complete Bernstein functions of the Laplace operator

Abstract

We discuss representation of certain functions of the Laplace operator as Dirichlet-to-Neumann maps for appropriate elliptic operators in half-space. A classical result identifies (-)1/2, the square root of the d-dimensional Laplace operator, with the Dirichlet-to-Neumann map for the (d + 1)-dimensional Laplace operator t,x in (0, ∞) × Rd. Caffarelli and Silvestre extended this to fractional powers (-)α/2, which correspond to operators ∇t,x (t1 - α ∇t,x). We provide an analogous result for all complete Bernstein functions of - using Krein's spectral theory of strings. Two sample applications are provided: a Courant--Hilbert nodal line theorem for harmonic extensions of the eigenfunctions of non-local Schr\"odinger operators (-) + V(x), as well as an upper bound for the eigenvalues of these operators. Here is a complete Bernstein function and V is a confining potential.