Structural matrix algebras and their lattices of invariant subspaces

We introduce a new category of Banach algebras, l 1 -Munn algebras which we use as a tool in the study of semigroup algebras. Then we characterize amenable l 1 -Munn algebras and also semisimple ones in this category. Applying these results to the semigroup algebras provides some characterizations o

Subdivision operators play an important role in wavelet analysis. This paper studies the algebraic properties of subdivision operators with matrix mask, especially their action on polynomial sequences and on some of their invariant subspaces. As an application, we characterize, under a mild conditio

This is a continuation of work in previous papers [N. Ajmal and K.V. Thomas, Fuzzy Sets and Systems 58 (1993) 217; Inform. Sci. 76 (1994) 1]. Here, we provide a common technique of constructing the join of fuzzy substructures. Consequently, it leads to the formation of various types of lattices and