K-Theory and homotopy theory constitute pivotal branches of modern mathematics, forming a bridge between algebraic invariants and topological structures. This intersection has fostered the development ...
Hermitian K-theory is the study of unimodular forms through the eyes of K-theory. In work of B. Calmès, E. Dotto, Y. Harpaz, F. Hebestreit, M. Land, K. Moi, D. Nardin, T. Nikolaus and W. Steimle, it ...
Algebraic K-theory and homotopy theory constitute two interlinked areas of modern mathematics that deepen our understanding of both algebraic and topological structures. The field of algebraic ...
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