Thema der Dissertation:
Assembly and norm maps via genuine equivariant homotopy theory Thema der Disputation:
On commutative monoids and the universality of infinite loop space machines
Assembly and norm maps via genuine equivariant homotopy theory Thema der Disputation:
On commutative monoids and the universality of infinite loop space machines
Abstract: The seminal paper 'On categories and cohomological theories' (1974) by Graeme Segal laid the foundation for modern homotopy coherent algebra, but leaves its interactions with multiplicative structure largely unanswered.
Using the contemporary tools of $\infty$-categorical algebra, David Gepner, Moritz Rahn né Groth and Thomas Nikolaus offer a highly general and canonical construction of the symmetric monoidal structures involved.
We give a summary of this circle of ideas and its techniques.
Using the contemporary tools of $\infty$-categorical algebra, David Gepner, Moritz Rahn né Groth and Thomas Nikolaus offer a highly general and canonical construction of the symmetric monoidal structures involved.
We give a summary of this circle of ideas and its techniques.
Zeit & Ort
17.07.2023 | 16:00
Seminarraum 019
(Fachbereich Mathematik und Informatik, Arnimallee 3, 14195 Berlin)