Yang-Mills connections on quantum Heisenberg manifolds
- Authors
- Kang, S.; Luef, F.; Packer, J.A.
- Issue Date
- 1-Mar-2020
- Publisher
- Academic Press Inc.
- Keywords
- Finitely generated projective modules; Morita equivalence; Quantum Heisenberg manifolds; Tensor product connection; Yang-Mills connections
- Citation
- Journal of Mathematical Analysis and Applications, v.483, no.1
- Journal Title
- Journal of Mathematical Analysis and Applications
- Volume
- 483
- Number
- 1
- URI
- https://scholarworks.bwise.kr/cau/handle/2019.sw.cau/38163
- DOI
- 10.1016/j.jmaa.2019.123604
- ISSN
- 0022-247X
1096-0813
- Abstract
- We investigate critical points and minimizers of the Yang-Mills functional YM on quantum Heisenberg manifolds Dμν c, where the Yang-Mills functional is defined on the set of all compatible linear connections on finitely generated projective modules over Dμν c. A compatible linear connection which is both a critical point and minimizer of YM is called a Yang-Mills connection. In this paper, we investigate Yang-Mills connections with constant curvature. We are interested in Yang-Mills connections on the following classes of modules over Dμν c: (i) Abadie's module Ξ of trace 2μ and its submodules; (ii) modules Ξ′ of trace 2ν; (iii) tensor product modules of the form PEμν c⊗Ξ, where Eμν c is Morita equivalent to Dμν c and P is a projection in Eμν c. We present a characterization of critical points and minimizers of YM, and provide a class of new Yang-Mills connections with constant curvature on Ξ over Dμν c via concrete examples. In particular, we show that every Yang-Mills connection ∇ on Ξ over Dμν c with constant curvature should have a certain form of the curvature such as [Formula presented]. Also we show that these Yang-Mills connections with constant curvature do not provide global minima but only local minima. We do this by constructing a set of compatible connections that are not critical points but their values are smaller than those of Yang-Mills connections with constant curvature. Our other results include: (i) an example of a compatible linear connection with constant curvature on Dμν c such that the corresponding connection on an isomorphic projective module does not have constant curvature, and (ii) the construction of a compatible linear connection with constant curvature which neither attains its minimum nor is a critical point of YM on Dμν c. Consequently the critical points and minimizers of YM depend crucially on the geometric structure of Dμν c and of the projective modules over Dμν c. Furthermore, we construct the Grassmannian connection on the projective modules Ξ′ with trace 2ν over Dμν c and compute its corresponding curvature. Finally, we construct tensor product connections on PEμν c⊗Ξ whose coupling constant is 2ν and characterize the critical points of YM for this projective module. © 2019 Elsevier Inc.
- Files in This Item
- There are no files associated with this item.
- Appears in
Collections - Da Vinci College of General Education > 1. Journal Articles
Items in ScholarWorks are protected by copyright, with all rights reserved, unless otherwise indicated.