Representation of artinian partially ordered sets over semiartinian Von Neumann regular algebras

Abstract

If R is a semiartinian Von Neumann regular ring, then the set R of primitive ideals of R, ordered by inclusion, is an artinian poset in which all maximal chains have a greatest element. Moreover, if R has no infinite antichains, then the lattice 2(R) of all ideals of R is anti-isomorphic to the lattice of all upper subsets of R. Since the assignment U rR(U) defines a bijection from any set R of representatives of simple right R-modules to R, a natural partial order is induced in R, under which the maximal elements are precisely those simple right R-modules which are finite dimensional over the respective endomorphism division rings; these are always R-injective. Given any artinian poset I with at least two elements and having a finite cofinal subset, a lower subset I' I and a field D, we present a construction which produces a semiartinian and unit-regular D-algebra DI having the following features: (a) DI is order isomorphic to I; (b) the assignment HDI/H realizes an anti-isomorphism from the lattice 2(DI) to the lattice of all upper subsets of DI; (c) a non-maximal element of DI is injective if and only if it corresponds to an element of I', thus DI is a right V-ring if and only if I' = I; (d) DI is a right and left V-ring if and only if I is an antichain; (e) if I has finite dual Krull length, then DI is (right and left) hereditary; (f) if I is at most countable and I' = , then DI is a countably dimensional D-algebra.