Inertial subalgebras of complete algebras

There exists a complete atomless Boolean algebra that has no proper atomless complete subalgebra.

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

We consider eight special kinds of subalgebras of Boolean algebras. In Section 1 we describe the relationships between these subalgebra notions. In succeeding sections we consider how the subalgebra notions behave with respect to the most common cardinal functions on Boolean algebras.

We show that diagonal subalgebras and generalized Veronese subrings of a bigraded Koszul algebra are Koszul. We give upper bounds for the regularity of side-diagonal and relative Veronese modules and apply the results to symmetric algebras and Rees rings. Recall that a positively graded K-algebra A