Borsboom, Silvester and Posthuma, Hessel (2025) Global Gauge Symmetries and Spatial Asymptotic Boundary Conditions in Yang-Mills theory. [Preprint]
![[img]](https://philsci-archive.pitt.edu/style/images/fileicons/text.png) |
Text
Global_gauge_symmetries_and_asymptotic_boundary_conditions (3).pdf Download (297kB) |
Abstract
In Yang-Mills gauge theory on a Euclidean Cauchy surface the group of gauge symmetries carrying direct empirical significance is often believed to be the quotient of the group of boundary-preserving gauge symmetries by its subgroup of transformations that are generated by the constraints of the theory. These groups are identified respectively as the gauge transformations that become constant asymptotically and those that become the identity asymptotically. In the Abelian case G=U(1) the quotient is then identified as the group of global gauge symmetries, i.e. U(1) itself. However, known derivations of this claim are imprecise, both mathematically and conceptually. We derive the physical gauge group rigorously for both Abelian and non-Abelian gauge theory. Our main new point is that the requirement to restrict to the group of asymptotically constant gauge transformations does not follow from finiteness of energy only, but from the requirement that the Lagrangian of Yang-Mills theory be defined on a tangent bundle to configuration space. Moreover, we explain why the quotient consists precisely of a copy of the global gauge group for every homotopy class, even if the various gauge transformations apparently have different asymptotic rates of convergence. Lastly, we consider Yang-Mills-Higgs theory in our framework and show that asymptotic boundary conditions differ in the unbroken and broken phases.
| Export/Citation: | EndNote | BibTeX | Dublin Core | ASCII/Text Citation (Chicago) | HTML Citation | OpenURL |
| Social Networking: |
| Item Type: | Preprint | |||||||||
|---|---|---|---|---|---|---|---|---|---|---|
| Creators: |
|
|||||||||
| Keywords: | gauge symmetry, Yang-Mills theory, Higgs mechanism, boundary conditions, asymptotic symmetry group, spatial infinity | |||||||||
| Subjects: | Specific Sciences > Physics > Classical Physics Specific Sciences > Physics > Fields and Particles Specific Sciences > Physics > Symmetries/Invariances |
|||||||||
| Depositing User: | Mr. Silvester Borsboom | |||||||||
| Date Deposited: | 25 Feb 2025 15:24 | |||||||||
| Last Modified: | 25 Feb 2025 15:24 | |||||||||
| Item ID: | 24810 | |||||||||
| Official URL: | https://arxiv.org/abs/2502.16151 | |||||||||
| Subjects: | Specific Sciences > Physics > Classical Physics Specific Sciences > Physics > Fields and Particles Specific Sciences > Physics > Symmetries/Invariances |
|||||||||
| Date: | 25 February 2025 | |||||||||
| URI: | https://philsci-archive.pitt.edu/id/eprint/24810 |
Monthly Views for the past 3 years
Monthly Downloads for the past 3 years
Plum Analytics
Actions (login required)
 |
View Item |
![[feed]](http://philsci-archive.pitt.edu/style/images/feed-icon-32x32.png){kind=icon}