Heat kernel asymptotics for real powers of Laplacians

Abstract

We describe the small-time heat kernel asymptotics of real powers r, r ∈ (0,1) of a non-negative self-adjoint generalized Laplacian acting on the sections of a hermitian vector bundle E over a closed oriented manifold M. First we treat separately the asymptotic on the diagonal of M × M and in a compact set away from it. Logarithmic terms appear only if n is odd and r is rational with even denominator. We prove the non-triviality of the coefficients appearing in the diagonal asymptotics, and also the non-locality of some of the coefficients. In the special case r=1/2, we give a simultaneous formula by proving that the heat kernel of 1/2 is a polyhomogeneous conormal section in E E* on the standard blow-up space Mheat of the diagonal at time t=0 inside [0,∞)× M × M.