Extension of distributions, scalings and renormalization of QFT on Riemannian manifolds

Abstract

Let M be a smooth manifold and X⊂ M a closed subset of M. In this paper, we introduce a natural condition of moderate growth along X for a distribution t in D(M X) and prove that this condition is equivalent to the existence of an extension of t in D(M) generalizing some previous results of Meyer and Brunetti--Fredenhagen. When X is a closed submanifold of M, we show that the concept of distributions with moderate growth coincides with weakly homogeneous distributions of Meyer. Then we renormalize products of distributions with functions tempered along X and finally, using the whole analytical machinery developed, we give an existence proof of perturbative quantum field theories on Riemannian manifolds.