Ring extension problem, Shukla cohomology and Ann-category theory

Abstract

Every ring extension of A by R induces a pair of group homomorphisms L*:R End(A)/L(A);R*:R End(A)/R(A), preserving multiplication, satisfying some certain conditions. A such 4-tuple (R,A,L*,R*) is called a ring pre-extension. Each ring pre-extension induces a R-bimodule structure on bicenter KA of ring A, and induces an obstruction k, which is a 3-cocycle of -algebra R, with coefficients in R-bimodule KA in the sense of Shukla. Each obstruction k in this sense induces a structure of a regular Ann-category of type (R,KA). This result gives us the first application of Ann-category in extension problems of algebraic structures, as well as in cohomology theories.