Markov semi-groups associated with the complex unimodular group Sl(2,C)

Abstract

In this paper, we derive the explicit expressions of two Markov semi-groups constructed by P. Biane in Bia1 from the restriction of a particular positive definite function on the complex unimodular group Sl(2,C) to two commutative subalgebras of its universal C-algebra. Our computations use Euclidean Fourier analysis together with the generating function of Laguerre polynomials with index -1, and yield absolutely-convergent double series representations of the semi-group densities. In the last part of the paper, we discuss the coincidence, noticed by Biane as well, occurring between the heat kernel on the Heisenberg group and the semi-group corresponding to the intersection of the principal and the complementary series. To this end, we appeal to the metaplectic representation Mp(4,R) and to the Landau operator in the complex plane.