The Star-product and its Algebraic Properties

In an alternative ring, when is the product of torsion units a torsion unit? We answer this question completely for alternative division rings, vector matrix algebras, and loop algebras.

The star-chromatic number and the fractional-chromatic number are two generalizations of the ordinary chromatic number of a graph. We say a graph G is star-extremal if its star-chromatic number is equal to its fractional-chromatic number. We prove that star-extremal graphs G have the following inter

Combining a construction of Dadarlat of a unital, simple, non-exact C\*-algebra C of real rank zero and stable rank one, which is shape equivalent to a UHFalgebra, with results of Kirchberg and a result obtained by Dadarlat and the firstnamed author, we show that B(H) C contains an ideal that is not

We will show that the crossed products of unital simple real rank zero AT algebras by the integers are AF embeddable. This is a generalization of Brown's AF embedding theorem. As an application, we will prove the AF embeddability of crossed product algebras arising from certain minimal dynamical sys