Spectrally cut-off GFF, regularized 4 measure, and reflection positivity

Abstract

We argue that the spectrally cut-off Gaussian free field on a compact Riemannian manifold or on Rn cannot satisfy the spatial Markov property. Moreover, when the manifold is reflection positive, we show that fails to be reflection positive. We explain the difficulties one encounters when trying to deduce the reflection positivity property of the measure exp(-\|\|L44) μGFF(d) from the reflection positivity property of the Gaussian free field measure μGFF in a naive way. These issues are probably well-known to experts of constructive quantum field theory but to our knowledge, no detailed account can be found in the litterature. Our pedagogical note aims to fill this small gap.

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