Structure theorems for families of idempotents

Families of Languages," abbreviated full AFL's, were introduced by S. Ginsburg and S. Greibach in [I 1]. It is well known that the family of contextfree languages is a full AFL . It is also a rational cone (according to Eilenberg's terminology) . Let Dn\* (respectively, D~\*) be the Dyck language (r

We consider a slight generalization of ordinary difference families that in the case A = 1 corresponds geomewically to a certain class of partial plane!;. We prove two composition theorems that yield the existence of new (ordinary) difference families and thus of new block designs with a point regul

Spinor spaces can be represented as minimal left ideals of Clifford algebras and they are generated by primitive idempotents. Primitive idempotents of the Clifford algebras Rp.q are shown to be products of mutually nonannihilating commuting idempotent factors I(1 +cT), where the k = q -rq\_p basis e

In this paper the existence and approximation of a unique common fixed point of two families of weakly compatible self-maps on a complete metric space are investigated. An example is presented to show that our results for the mappings considered satisfying non-linear contractive type conditions are