K0of Invariant Rings and NonabelianH1

This paper gives the following description of K of the endomorphism ring of a 0 finitely generated projective module. THEOREM. Let T be a ring and P a finitely generated, projecti¨e T-module. Let I Ž . Ž . be the trace ideal of P. Then K End P is isomorphic to a subgroup of K T, I . If, n phic to

Let G be a finite group acting linearly on a vector space V over a field K of positive characteristic p and let P ≤ G be a Sylow p-subgroup. Ellingsrud and Skjelbred [Compositio Math. 41 (1980), 233-244] proved the lower bound for the depth of the invariant ring, with equality if G is a cyclic p-gr

We show that the simple matroid PG n -1 q \PG k -1 q , for n ≥ 4 and 1 ≤ k ≤ n -2, is characterized by a variety of numerical and polynomial invariants. In particular, any matroid that has the same Tutte polynomial as PG n -

Let R be a semilocal ring, that is, R modulo its Jacobson radical J R is artinian. Then K 0 R/J R is a partially ordered abelian group with order-unit, isomorphic to Z n ≤ u , where ≤ denotes the componentwise order on Z n and u is an order-unit in Z n ≤ . Moreover, the canonical projection π: R → R