Homotopy theory and K‐theory are intertwined fields that have significantly advanced our understanding of topological spaces, algebraic structures and their interrelations. Homotopy theory studies ...

Homotopy theory, a central facet of algebraic topology, investigates spaces and maps up to continuous deformations, offering a flexible framework for understanding spatial and categorical structures.

Widely influential algebraic topologist and homotopy theorist Jack Morava, professor in the Department of Mathematics at Johns Hopkins University for nearly four decades, died in Boston on Aug. 1 ...

I am an algebraic topologist and a stable homotopy theorist. I study chromatic homotopy theory and its interactions with equivariant homotopy theory. I also work with condensed matter physicists to ...

$\bullet$ Homotopy theory and Higher Algebra. $\bullet$ Algebraic $K$-theory. $\bullet$ Field theories and mathematical Physics. $\bullet$ (topological) Hochschild ...

$\bullet$ Differential topology, algebraic $K$-and $L$-theory. $\bullet$ Functor Calculus, Homotopy theory.