Local ζ-function techniques vs point-splitting procedure: a few rigorous results
Abstract
Some general properties of local ζ-function procedures to renormalize some quantities in D-dimensional (Euclidean) Quantum Field Theory in curved background are rigorously discussed for positive scalar operators - + V(x) in general closed D-manifolds, and a few comments are given for nonclosed manifolds too. A general comparison is carried out with respect to the more known point-splitting procedure concerning the effective Lagrangian and the field fluctuations. It is proven that, for D>1, the local ζ-function and point-splitting approaches lead essentially to the same results apart from some differences in the subtraction procedure of the Hadamard divergences. It is found that the ζ function procedure picks out a particular term w0(x,y) in the Hadamard expansion. Also the presence of an untrivial kernel of the operator - +V(x) may produce some differences between the two analyzed approaches. Finally, a formal identity concerning the field fluctuations, used by physicists, is discussed and proven within the local ζ-function approach. This is done also to reply to recent criticism against ζ-function techniques.
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