Dr Amit Hazi
Contact
- Dr Amit Hazi
- +44 (0)20 7040 4347
- amit.hazi@city.ac.uk
Postal Address
City, University of London
Northampton Square
London
EC1V 0HB
United Kingdom
Northampton Square
London
EC1V 0HB
United Kingdom
About
Overview
Dr Hazi read Mathematics at the University of Cambridge, graduating in 2013 with a combined BA/MMath degree. He continued his postgraduate studies at Cambridge, completing a PhD in 2018. After working as a postdoctoral researcher at the University of Leeds, he joined City as an 1851 Research Fellow in 2019.
Qualifications
- PhD, University of Cambridge, United Kingdom, Oct 2013 – Apr 2018
- MMath, University of Cambridge, United Kingdom, Oct 2012 – Jun 2013
- BA, University of Cambridge, United Kingdom, Oct 2009 – Jun 2012
Postgraduate training
- Postdoctoral Research Assistant, University of Leeds, Leeds, United Kingdom, Oct 2017 – Sep 2018
Employment
- Research Fellow, City, University of London, Oct 2019 – present
Fellowships
- 1851 Research Fellow, Royal Commission for the Exhibition of 1851, Oct 2019 – Sep 2022
Memberships of professional organisations
- Associate, London Mathematical Society, Nov 2018 – present
Publications
Journal articles (6)
- Hazi, A. (2017). Radically filtered quasi-hereditary algebras and rigidity of tilting modules. Mathematical Proceedings of the Cambridge Philosophical Society, 163(2), pp. 265–288. doi:10.1017/S0305004116001006.
- Hazi, A. (2017). Balanced semisimple filtrations for tilting modules. Representation Theory, 21(2), pp. 4–19. doi:10.1090/ert/495.
- Hazi, A. Matrix recursion for positive characteristic diagrammatic Soergel
bimodules for affine Weyl groups. . - Bowman, C., Hazi, A. and Norton, E. The modular Weyl-Kac character formula. .
- Bowman, C., Cox, A. and Hazi, A. Path isomorphisms between quiver Hecke and diagrammatic Bott-Samelson
endomorphism algebras. . - Bowman, C., Cox, A., Hazi, A. and Michailidis, D. Path combinatorics and light leaves for quiver Hecke algebras. .
Working paper
- Hazi, A., Martin, P.P. and Parker, A.E. (2021). Indecomposable tilting modules for the blob algebra.