Clifford Coherent State Transforms on Spheres

Abstract

We introduce a one-parameter family of transforms, Ut(m), t>0, from the Hilbert space of Clifford algebra valued square integrable functions on the m--dimensional sphere, L2(Sm,dσm) Cm+1, to the Hilbert spaces, ML2(Rm+1 \0\,dμt), of monogenic functions on Rm+1 \0\ which are square integrable with respect to appropriate measures, dμt. We prove that these transforms are unitary isomorphisms of the Hilbert spaces and are extensions of the Segal-Bargman coherent state transform, U(1) : L2(S1,dσ1) HL2(C \0\,dμ), to higher dimensional spheres in the context of Clifford analysis. In Clifford analysis it is natural to replace the analytic continuation from Sm to SmC as in Ha1, St, HM by the Cauchy--Kowalewski extension from Sm to Rm+1 \0\. One then obtains a unitary isomorphism from an L2--Hilbert space to an Hilbert space of solutions of the Dirac equation, that is to a Hilbert space of monogenic functions.