Additive K-theory is a branch of algebraic K-theory that focuses on understanding certain additive invariants associated with rings and categories. It can be thought of as a refinement of classical K-theory, emphasizing the structured behavior of additive operations. In general, K-theory studies vector bundles, projective modules, and their relations to the topology of the underlying spaces or algebraic structures.
Articles by others on the same topic
There are currently no matching articles.