Hermitian geometry with torsion on principal bundles and applications
BRIDGES: Brazil-France interplays in Gauge Theory, extremal structures and stability
The problem of Gauge fixation in the action and the duality in D = 2 + 1 dimensions
Grant number: | 21/07249-0 |
Support Opportunities: | Scholarships in Brazil - Post-Doctoral |
Start date until: | November 01, 2021 |
End date until: | January 31, 2024 |
Field of knowledge: | Physical Sciences and Mathematics - Mathematics - Geometry and Topology |
Principal Investigator: | Henrique Nogueira de Sá Earp |
Grantee: | Udhav Fowdar |
Host Institution: | Instituto de Matemática, Estatística e Computação Científica (IMECC). Universidade Estadual de Campinas (UNICAMP). Campinas , SP, Brazil |
Associated research grant: | 18/21391-1 - Gauge theory and algebraic geometry, AP.TEM |
Abstract G2 and Spin (7) manifolds are special classes of Einstein manifolds occurring in dimensions 7 and 8 respectively. Aside from being mathematically interesting, they are also of interest to physicists as they occur in M- and F-theories: generalisations of supersymmetric string theories. This project is broadly concerned with studying problems pertaining to these so-called exceptional holonomy manifolds in the presence of continuous group actions. Since exceptional holonomy manifolds are Ricci-flat, the hypothesis that they admit Killing vector fields implies that we must consider non-compact examples. A key advantage that the non-compact setting has over the compact one is that one can often expect to find explicit solutions. More specifically the main problems that we want to address about these manifolds are as follows: 1. Given certain torus actions on a G2 or Spin (7) manifold, what are the geometric properties of the quotient space? Can one characterise/classify all such examples? Can one construct new examples of G2 and Spin (7) metrics starting from suitable data on the quotient space?; 2. Calibrated submanifolds are special classes of minimal submanifolds introduced by Harvey-Lawson. In G2 manifolds these are known as associatives and co-associatives, and in Spin (7) manifolds they are called Cayley submanifolds. We want to construct examples of such objects which are invariant under certain G action. In particular, one of our main goal is to construct explicit examples of Cayley fibrations; 3. G2 and Spin (7) instantons are higher dimensional generalisations of ASD instantons. These are conjectured to play an important role in defining topological invariants just like ASD instantons on 4-manifolds. We want to construct explicit examples of such instantons which are invariant under certain torus actions and study their properties; 4. The G2 Laplacian flow is a geometric flow introduced by Robert Bryant as a way of potentially deforming a closed G2-structure to a torsion free one. It can be viewed as an analogue of the Kähler Ricci flow for G2 manifolds. We want to investigate a cohomogeneity one version of the flow on the spinor bundle of the 3-sphere (which is known to admit a 1-parameter family of G2 metrics). (AU) | |
News published in Agência FAPESP Newsletter about the scholarship: | |
More itemsLess items | |
TITULO | |
Articles published in other media outlets ( ): | |
More itemsLess items | |
VEICULO: TITULO (DATA) | |
VEICULO: TITULO (DATA) | |