Cohomological Invariants of Algebras with Involution

By the method of cyclic cohomology we prove that all tracial states on a twisted group \(C^{*}\)-algebra \(C^{*}(G ; \sigma)\), where \(G\) is a torsion free discrete group of polynomial growth and \(\sigma\) is a 2-cocycle on \(G\) with values in the unit circle group, induce the same map from \(K_

Let G be a linear algebraic group defined over a field F. One can define an equivalence relation (called R-equivalence) on the group G F of points over F as follows (cf. [4, 9, 14]). Two points g 0 g 1 ∈ G F are R-equivalent, if there is a rational morphism f 1 F → G of algebraic varieties over F de

Let D be a division algebra of degree 3 over its center K and let J be an involution of the second kind on D. Let F be the subfield of K of elements invariant under J, char F / 3. We present a simple proof of a theorem of A. Albert on the existence of a maximal subfield of D which is Galois over F w

In this paper we study central polynomials for the matrix algebra M 2n K \* with symplectic involution \* . Their form is inspired by an apporach of Formanek and Bergman for investigating matrix identities by means of commutative algebra. We continue the investigations started earlier (1999,

Let ᑡ be a simply connected simple ‫ކ‬ -group, let ᑜ be a Borel p ؒ Ž . subgroup of ᑡ, and let H ᑡrᑜ, ? be the right-derived functors of the induction from the category of ᑜ-modules to the category of ᑡ-modules. Let ᑠ ᒏ: ᑡ ª ᑡ Ž1. be the Frobenius morphism and define the functors H ᑡ rᑜ , ? likewis