I am currently a researcher at the Università di Padova. Previously, I was a PhD student at the University of Birmingham under the supervision of Simon Goodwin. My research interests are:
Representation theory of Lie algebras and algebraic groups, in both the ordinary and modular settings.
Representation theory of quantum groups.
Finite W-algebras.
Truncated current Lie algebras.
Conical Sympletic Singularities.
A copy of my CV can be found here: CV
Category O for Takiff Lie algebras.
Math. Z. 304, 14 (2023). (journal, arxiv)
Category O for truncated current Lie algebras. (with Lewis Topley)
Canadian Journal of Mathematics, (2023). doi:10.4153/S0008414X23000664 (journal, arxiv)
Modular representations of truncated current Lie algebras. (preprint, with Lewis Topley)
arXiv:2311.08208 (arxiv)
Composition multiplicities of Verma modules for truncated current Lie algebras.
Algebra and Representation Theory Seminar, University of Cambridge, 21/02/24
Representation Theory of truncated current Lie algebras.
Algebra Seminar, University of York, 15/02/24
Composition multiplicities of Verma modules for truncated current Lie algebras.
Algebra Seminar, University of Warwick, 20/11/23
Representation theory of truncated current Lie algebras in positive characteristic.
Algebra Seminar, Uppsala University, 12/09/23
Representation Theory of truncated current Lie algebras.
AGATA Seminar, University of Warwick, 01/06/23.
Category O for truncated current Lie algebras
Algebra, Geometry, and Number Theory Seminar, University of Bath, 14/03/23.
I am helping to organise the 2024 edition of the Postgraduate Group Theory Conference (PGTC) at the University of Birmingham, which will take place in Summer 2024.
In September 2023, I visited to Uppsala University to work with Prof. Volodymyr Mazorchuk on problems related to primitive ideals of the enveloping algebras of Takiff Lie algebras.
In August 2022, I was a Visiting Postgraduate Scholar at the University of Bath, working with Dr Lewis Topley on the representation theory of truncated current Lie algebras.