Classification of Poincaré duality algebras over the rationals

The concept of continuity of a duality (i.e., involutive contravariant endofunctor) of the category L R of locally compact modules over a discrete commutative ring R, was introduced by Prodanov. Orsatti and the first-named author proved that the category L R admits discontinuous dualities when R is

Let ∆ be a finite set of nonzero linear forms in several variables with coefficients in a field K of characteristic zero. Consider the K-algebra R(∆) of rational functions on V which are regular outside α∈∆ ker α. Then the ring R(∆) is naturally doubly filtered by the degrees of denominators and of

For Λ a finite-dimensional k-algebra, k a field, we study the relations between the category of all left Λ-modules, Mod Λ, and the category of finitely generated Λ ⊗ k k(x) = Λ k(x) -modules, mod Λ k (x) . In particular, we consider those G ∈ mod Λ k(x) such that Λ G is indecomposable. We prove that

In this article, we will give a complete classification of simple C \* -algebras which can be written as inductive limits of algebras of the form A n ¼ È kn i¼1 M ½n;i ðCðX n;i ÞÞ, where X n;i are arbitrary variable one-dimensional compact metrizable spaces. The results unify and generalize the prev