Modified heat equations for an analytic continuation of the spectral ζ function

Abstract

For an elliptic differential operator D of order h in n dimensions, the spectral ζ-function ζD(s) for s > nh can be evaluated as an integral over the heat kernel e-t D. Here, alternative expressions for ζD(s) are presented involving an integral over kernels kn,m for a modified heat equation, such that the integral is non-singular around s=0, respectively close to potential poles around s=mh, m<n. Besides explicit expressions for an analytic continuation of ζD(s) when s ≤ nh, this provides an alternative method to study functional determinants and the residues of ζD(s) that does not require to compute Seeley-DeWitt coefficients explicitly to cancel divergences in the heat trace.