# Vector-scalar mixing to all orders, for an arbitrary gauge model in the   generic linear gauge

**Authors:** Adrian Lewandowski (Albert Einstein Center for Fundamental Physics,, Institute for Theoretical Physics, University of Bern)

arXiv: 1903.09670 · 2019-06-26

## TL;DR

This paper derives explicit formulas for vector and scalar propagators in arbitrary linear gauges within gauge theories, accounting for all-order mixing and providing generalized wavefunction renormalization factors crucial for accurate amplitude calculations.

## Contribution

It introduces a comprehensive method to compute propagators with vector-scalar mixing to all orders in arbitrary gauges, extending standard renormalization techniques.

## Key findings

- Explicit all-order propagator formulas derived.
- Generalized $\
- contribution

## Abstract

I give explicit fromulae for full propagators of vector and scalar fields in a generic spin-1 gauge model quantized in an arbitrary linear covariant gauge. The propagators, expressed in terms of all-order one-particle-irreducible correlation functions, have a remarkably simple form because of constraints originating from Slavnov-Taylor identities of Becchi-Rouet-Stora symmetry. I also determine the behavior of the propagators in the neighborhood of the poles, and give a simple prescription for the coefficients that generalize (to the case with an arbitrary vector-scalar mixing) the standard $\sqrt{\mathcal{Z}}$ factors of Lehmann, Symanzik and Zimmermann. So obtained generalized $\sqrt{\mathcal{Z}}$ factors, are indispensable to the correct extraction of physical amplitudes from the amputated correlation functions in the presence of mixing. The standard $R_\xi$ guauges form a particularly important subclass of gauges considered in this paper. While the tree-level vector-scalar mixing is, by construction, absent in $R_\xi$ gauges, it unavoidably reappears at higher orders. Therefore the prescription for the generalized $\sqrt{\mathcal{Z}}$ factors given in this paper is directly relevant for the extraction of amplitudes in $R_\xi$ gauges.

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Source: https://tomesphere.com/paper/1903.09670