The heat kernel on a complex semisimple Lie group and an integral presentation of the heat kernel on its split real form

Abstract

Let G be a connected semisimple Lie group, and G0 be its connected split real form. In this paper, we deduce explicit expressions for the heat kernels G0t associated with the Laplace--Beltrami operators G0 and G respectively, using the algebra of differential operators on an appropriate homogeneous space. These expressions involve the heat Gaussian and the heat kernel on a maximal compact subgroup. Using these expressions for G0t and Gt, we derive an integral formula relating the heat kernel G0t to Gt. In the special case of G0=SL(2,R), we show that the integral formula of SL(2,R) is expressed in terms of the properties of Tchebycheff polynomials.