Commutative algebra and algebraic geometry form a deeply interwoven field that investigates the structure of polynomial rings, their ideals, and the geometric objects defined by these algebraic sets.

I joined the Mathematics Department at LSE as an assistant professor (education) in September 2024. I obtained my PhD degree in Mathematics at the University of Sheffield, under the supervision of Dr ...

My area of research is operator algebras and applications to geometry, with particular emphasis on commutative and non-commutative orbifolds and their C*-algebras. In particular, I established index ...

Our work group represents the fields of operator algebras and noncommutative geometry in teaching and research. The current focus of our research is structure of C * algebras and more general ...

My research spans algebraic topology and functional analysis. I am particularly interested in area where the two fields intersect, such as non-commutative geometry, K-theory, index theory and coarse ...

Vol. 358, No. 1765, Science into the Next Millenium: Young Scientists Give Their Visions of the Future: II. Mathematics, Physics and Engineering (Jan., 2000), pp. 89-109 (21 pages) A search for the ...

Selected Projects • EXC 2044 - B3: Operator algebras & mathematical physics The development of operator algebras was largely motivated by physics since they provide the right mathematical framework ...