• 2014.9 - 2018.9 PhD in Mathematics, EPSRC Doctoral Training Centre: London School of Geometry and Number theory. PhD studies based at Kings College London
• 2010-2014 MMath degree in Mathematics, University of Warwick.
In my research I study special classes of symplectic manifolds with a Hamiltonian group of symmetries. I am interested in the symplectic analogue of Fano varieties, called symplectic Fano manifolds, and to what extent these symplectic manifolds satisfy the boundedness of their algebraic counter-parts. In a joint work with Dmitri Panov we were able to show that 6-dimensional symplectic Fano manifolds with a Hamiltonian circle action are simply connected. One of the main tools was to apply results of 4-dimensional symplectic geometry, such as Seiberg-Witten theory, via symplectic reduction. Currently, I am working to investigate other geometric and topological properties of symplectic Fano manifolds with a Hamiltonian circle action.
S1-invariant symplectic hypersurfaces in dimension 6 and the Fano condition (Joint with Dmitri Panov). Journal of Topology, Volume 12, Issue 1, 2019