Sums of Betti Numbers in Arbitrary Characteristic

An algorithm for the evaluation of products of arbitrary conjugacy class-sums in the symmetric group is conjectured. This algorithm generalizes a procedure presented sometime ago, which deals with products in which at least one of the Ž class-sums involved consists of a single cycle and an appropria

We show that every (discrete) group ring D½G of a free-by-amenable group G over a division ring D of arbitrary characteristic is stably finite, in the sense that one-sided inverses in all matrix rings over D½G are two-sided. Our methods use Sylvester rank functions and the translation ring of an ame

Convergence properties of weighted sums of functions in \(D([0,1] ; E)(E\) a Banach space) are investigated. We show that convergence in the Skorokhod \(J_{1}\)-topology of a sequence \(\left(x_{n}\right)\) in \(D([0,1] ; E)\) does not imply convergence of a sequence \(\left(\bar{x}_{n}\right)\) of

Canonical number systems are the natural generalization of q-adic number systems to number fields. Such number systems admit a certain representation of each algebraic integer of a given number field with respect to the powers of a given base number b. The aim of this paper is to study the sum of di