Sheaves of C*-algebras

In this paper, inspired by methods of Bigard, Keimel, and Wolfenstein ([2]), we develop an approach to sheaf representations of MV-algebras which combines two techniques for the representation of MV-algebras devised by Filipoiu and Georgescu ([18]) and by Dubuc and Poveda ([16]). Following Davey app

The aim of this work is to study the existence of free \*-subalgebras in C\*algebras. The Kurosh Levitzky Problem and related conjectures of Makar-Limanov are answered in the context of C\*-algebras. In particular, we characterize and study the existence of free non-Abelian \*-subalgebras with two s

**A Timeless, Beautiful Allegory of the Biblical Love Story of Ruth and Boaz** The Great Rebellion of 1857 was a remarkably bloody business. At a time when Britain's imperial influence in India was sparking brutal clashes on both sides, no one could have expected Rena, an Indian woman, to mar

In this note, we calculate projective limits of localization functors. We relate the results, thus obtained, to the construction of structure sheaves for noncommutative rings.

## Abstract Slice regular functions have been introduced in 20 as solutions of a special partial differential operator with variable coefficients. As such they do not naturally form a sheaf. In this paper we use a modified definition of slice regularity, see 21, to introduce the sheaf of slice regu