The group of L2 isometries on H10

Abstract

Let U be an open subset of Rn. Let L2=L2(U,dx) and H10=H10(U) be the standard Lebesgue and Sobolev spaces of complex-valued functions. The aim of this paper is to study the group G of invertible operators on H10 which preserve the L2-inner product. When U is bounded and the border ∂ U is smooth, this group acts as the intertwiner of the H10 solutions of the non-homogeneous Helmholtz equation u- u=f, u|∂ U=0. We show that G is a real Banach-Lie group, whose Lie algebra is (i times) the space of symmetrizable operators. We discuss the spectrum of operators belonging to G by means of examples. In particular, we give an example of an operator in G whose spectrum is not contained in the unit circle. We also study the one parameter subgroups of G. Curves of minimal length in G are considered. We introduce the subgroups Gp:=G (I - Bp(H10)), where Bp(H01) is a Schatten ideal of operators on H01. An invariant (weak) Finsler metric is defined by the p-norm of the Schatten ideal of operators of L2. We prove that any pair of operators g1,g2 in Gp can be joined by a minimal curve of the form a(t)=g1 eitX, where X is a symmetrizable operator in Bp(H10).