Algebraic structures arising in number fields underpin the study of solutions to polynomial equations over finite extensions of the rationals. The ring of integers in a number field encapsulates its ...
Algebraic topology seeks to classify and analyse spaces by translating geometric and continuous properties into algebraic invariants. Among these, the fundamental group stands as a primary tool: it ...
The study of symmetry and space through the medium of groups and their actions has long been a central theme in modern mathematics, indeed one that cuts across a wide spectrum of research within the ...
This workshop focuses on recent advances around the (co-)homology of general linear and related groups. These basic topological invariants are, for example, related to questions in algebraic K-theory ...
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