Pseudo-Riemannian Spectral Triples for SU(1,1)
Abstract
We use the harmonic analysis of SU(1,1) to show that the triple (A,H,D), with D (the closure of) Kostant's cubic Dirac operator acting on the Hilbert space H=L2(SU(1,1))2, and with *-algebra A=C∞c(SU(1,1)) 1, forms both a pseudo-Riemannian spectral triple in the sense of Van den Dungen, Paschke and Rennie, and an indefinite spectral triple in the sense of Van den Dungen and Rennie.
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