Functional calculus on Venturi for Groups with Finite Propagation Speed

Abstract

Let M be a complete Riemannian manifold with Ricci curvature bounded below and Laplace operator . The paper develops a functional calculus for the cosine family (t ) which is associated with waves that travel at unit speed. If f is holomorphic on a Venturi shaped region, and zkf(z) is bounded for some positive integer k, then f( ) defines a bounded linear operator on Lp(M) for some p>2. For Jacobi hypergroups with invariant measure m the generalized Fourier transform of f∈ L1(m) gives f∈ H∞ (ω) for some strip ω. Hence one defines f(A) for operators A in some Banach space that have a H∞ (ω) functional calculus. The paper introduces an operational calculus for the Mehler--Fock transform of order zero. By transference methods, one defines f(A) when f is a s-Marcinkiewicz multiplier and eitA is a strongly continuous operator group on a Lp space for | 1/2-1/p| <1/s.