Seiberg–Witten-like equations on 5-dimensional contact metric manifolds
Abstract
In this paper, we write Seiberg–Witten-like equations on contact metric manifolds of dimension 5. Since any contact metric manifold has a Spinc -structure, we use the generalized Tanaka–Webster connection on a Spinc spinor bundle of a contact metric manifold to define the Dirac-type operators and write the Dirac equation. The self-duality of 2 -forms needed for the curvature equation is defined by using the contact structure. These equations admit a nontrivial solution on 5 -dimensional strictly pseudoconvex CR manifolds whose contact distribution has a negative constant scalar curvature In this paper, we write Seiberg–Witten-like equations on contact metric manifolds of dimension 5. Since any contact metric manifold has a Spinc -structure, we use the generalized Tanaka–Webster connection on a Spinc spinor bundle of a contact metric manifold to define the Dirac-type operators and write the Dirac equation. The self-duality of 2 -forms needed for the curvature equation is defined by using the contact structure. These equations admit a nontrivial solution on 5 -dimensional strictly pseudoconvex CR manifolds whose contact distribution has a negative constant scalar curvature
Source
Turkish Journal of MathematicsVolume
38Issue
5URI
http://www.trdizin.gov.tr/publication/paper/detail/TVRnMk9USTRPQT09https://hdl.handle.net/11421/18183
Collections
- Makale Koleksiyonu [257]
- TR-Dizin İndeksli Yayınlar Koleksiyonu [3512]