Super-Gaussian Decay of Exponentials: A Sufficient Condition
Abstract
In this article, we present a sufficient condition for the exponential (-f) to have a tail decay stronger than any Gaussian, where f is defined on a locally convex space X and grows faster than a squared seminorm on X. In particular, our result proves that (-p(x)2++α q(x)2) is integrable for all α,>0 w.r.t. a Radon Gaussian measure on a nuclear space X, if p and q are continuous seminorms on X with compatible kernels. This can be viewed as an adaptation of Fernique's theorem and, for example, has applications in quantum field theory.
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