A Reflexivity Theorem for Subspaces of Calkin Algebras

269 305) that a semigroup of matrices is triangularizable if the ranks of all the commutators of elements of the semigroup are at most 1. Our main theorem is an extension of this result to semigroups of algebraic operators on a Banach space. We also obtain a related theorem for a pair [A, B] of arbi

## Abstract In this paper an algebraic version for temporal algebras of the logical filtrations for modal and temporal logics is analysed. A structure theorem for free temporal algebras and also some results with regard to the variety of temporal algebras are obtained.

Let ᒄ be a semisimple Lie algebra over an algebraically closed field of Ä 4 characteristic zero with a root basis s ␣ , . . . , ␣ , root system ⌬, and Cartan subalgebra ᒅ. One may associate to any non-empty subset Ј n a parabolic subalgebra ᒍ , which is defined by the following root space

Spaces of operators that are left and right modules over maximal abelian selfadjoint algebras (masa bimodules for short) are natural generalizations of algebras with commutative subspace lattices. This paper is concerned with density properties of finite rank operators and of various classes of comp