# Nonlocal Scalar Quantum Field Theory: Functional Integration, Basis   Functions Representation and Strong Coupling Expansion

**Authors:** M. Bernard, V.A. Guskov, M.G. Ivanov, A.E. Kalugin, S.L. Ogarkov

arXiv: 1903.10581 · 2019-08-30

## TL;DR

This paper develops a nonlocal scalar quantum field theory framework using functional integration and basis functions, providing new representations of the generating functional and analyzing strong coupling expansions and phase transitions.

## Contribution

It introduces novel integral representations of the generating functional in nonlocal QFT using basis functions and explores strong coupling expansions and phase transition conditions.

## Key findings

- Derived explicit expressions for the generating functional in nonlocal scalar QFT.
- Calculated integrals over separable Hilbert space for polynomial and nonpolynomial theories.
- Numerically identified critical parameters for phase transitions.

## Abstract

Nonlocal QFT of one-component scalar field $\varphi$ in $D$-dimensional Euclidean spacetime is considered. The generating functional (GF) of complete Green functions $\mathcal{Z}$ as a functional of external source $j$, coupling constant $g$, and spatial measure $d\mu$ is studied. An expression for GF $\mathcal{Z}$ in terms of the abstract integral over the primary field $\varphi$ is given. An expression for GF $\mathcal{Z}$ in terms of integrals over the primary field and separable Hilbert space (HS) is obtained by means of a separable expansion of the free theory inverse propagator $\hat{L}$ over the separable HS basis. The classification of functional integration measures $\mathcal{D}\left[\varphi\right]$ is formulated, according to which trivial and two nontrivial versions of GF $\mathcal{Z}$ are obtained. Nontrivial versions of GF $\mathcal{Z}$ are expressed in terms of $1$-norm and $0$-norm, respectively. The definition of the $0$-norm generator $\varPsi$ is suggested. Simple cases of sharp and smooth generators are considered. Expressions for GF $\mathcal{Z}$ in terms of integrals over the separable HS with new integrands are obtained. For polynomial theories $\varphi^{2n},\, n=2,3,4,\ldots,$ and for the nonpolynomial theory $\sinh^{4}\varphi$, integrals over the separable HS in terms of a power series over the inverse coupling constant $1/\sqrt{g}$ for both norms ($1$-norm and $0$-norm) are calculated. Critical values of model parameters when a phase transition occurs are found numerically. A generalization of the theory to the case of the uncountable integral over HS is formulated. A comparison of two GFs $\mathcal{Z}$, one in the case of uncountable HS integral and one obtained using the Parseval-Plancherel identity, is given.

## Full text

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## Figures

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## References

44 references — full list in the complete paper: https://tomesphere.com/paper/1903.10581/full.md

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