Additive K-theory

In mathematics, additive K-theory means some version of algebraic K-theory in which, according to Spencer Bloch, the general linear group GL has everywhere been replaced by its Lie algebra gl.[1] It is not, therefore, one theory but a way of creating additive or infinitesimal analogues of multiplicative theories.

Formulation

Following Boris Feigin and Boris Tsygan,[2] let $A$ be an algebra over a field $k$ of characteristic zero and let ${{\mathfrak {g}}l}(A)$ be the algebra of infinite matrices over $A$ with only finitely many nonzero entries. Then the Lie algebra homology

H_{\cdot }({{\mathfrak {g}}l}(A),k)

has a natural structure of a Hopf algebra. The space of its primitive elements of degree $i$ is denoted by $K_{i}^{+}(A)$ and called the $i$ -th additive K-functor of A.

The additive K-functors are related to cyclic homology groups by the isomorphism

HC_{i}(A)\cong K_{i+1}^{+}(A).

References

Bloch, Spencer (2006-07-23). "Algebraic Cycles and Additive Chow Groups" (PDF). Dept. of Mathematics, University of Chicago. {{cite journal}}: Cite journal requires |journal= (help)
B. Feigin, B. Tsygan. Additive K-theory, LNM 1289, Springer

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[1] Bloch, Spencer (2006-07-23). "Algebraic Cycles and Additive Chow Groups" (PDF). Dept. of Mathematics, University of Chicago. {{cite journal}}: Cite journal requires |journal= (help)

[2] B. Feigin, B. Tsygan. Additive K-theory, LNM 1289, Springer