arXiv:2108.11312 Abstract | arXiv Analytics

arXiv:2108.11312 [math.PR]Abstract References Reviews Resources

An SPDE approach to perturbation theory of $Φ^4_2$: asymptoticity and short distance behavior

Published 2021-08-25Version 1

In this paper we study the perturbation theory of $\Phi^4_2$ model on the whole plane via stochastic quantization. We use integration by parts formula (i.e. Dyson-Schwinger equations) to generate the perturbative expansion for the $k$-point correlation functions, and prove bounds on the remainder of the truncated expansion using PDE estimates; this in particular proves that the expansion is asymptotic. Furthermore, we derive short distance behaviors of the $2$-point function and the connected $4$-point function, also via suitable Dyson-Schwinger equations combined with PDE arguments.

Comments: 36 pages

Categories: math.PR, math-ph, math.AP, math.MP

Keywords: perturbation theory, spde approach, dyson-schwinger equations, asymptoticity, point function

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arXiv:2108.11312 [math.PR]Abstract References Reviews Resources

An SPDE approach to perturbation theory of $Φ^4_2$: asymptoticity and short distance behavior

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An SPDE approach to perturbation theory of $Φ^4_2$: asymptoticity and short distance behavior

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arXiv:2108.11312 [math.PR]Abstract References Reviews Resources