Add to ORKGCellular algebras have recently been introduced by Graham and Lehrer [5, 6] as a convenient axiomatization of all of the following algebras, each of them containing information on certain classical algebraic or finite groups: group algebras o
In this thesis we study several algebras which are related to the bubble algebra, including the bub...
AbstractGraham and Lehrer have defined cellular algebras and developed a theory that allows in parti...
We show that, over an arbitrary field, q-rook monoid algebras are iterated inflations of Iwahori-Hec...
To a large extent, algebraic representation theory of Lie algebras, algebraic groups and related fin...
. We introduce procellular algebras, so called because they are inverse limits of finite dimensional...
Les algèbres cellulaires furent introduite par J.J. Graham et G.I. Lehrer en 1996. Elles forment un...
AbstractGraham and Lehrer have defined cellular algebras and developed a theory that allows in parti...
We present a result characterising iterated inflations of cellular algebras, derived from the work o...
AbstractWe show that under certain compatability assumptions, the semigroup algebra of an inverse se...
We show that under certain compatability assumptions, the semigroup algebra of an inverse semigroup ...
We introduce procellular algebras, so called because they are inverse limits of finite dimensional c...
One of the central problems in the representation theory of nite groups and nite dimensional algebra...
We explain how the theory of sandwich cellular algebras can be seen as a version of cell theory for ...
In this paper we generalize cellular algebras by allowing different partial orderings relative to fi...
In this paper we study handlebody versions of classical diagram algebras, most prominently, handlebo...
In this thesis we study several algebras which are related to the bubble algebra, including the bub...
AbstractGraham and Lehrer have defined cellular algebras and developed a theory that allows in parti...
We show that, over an arbitrary field, q-rook monoid algebras are iterated inflations of Iwahori-Hec...
To a large extent, algebraic representation theory of Lie algebras, algebraic groups and related fin...
. We introduce procellular algebras, so called because they are inverse limits of finite dimensional...
Les algèbres cellulaires furent introduite par J.J. Graham et G.I. Lehrer en 1996. Elles forment un...
AbstractGraham and Lehrer have defined cellular algebras and developed a theory that allows in parti...
We present a result characterising iterated inflations of cellular algebras, derived from the work o...
AbstractWe show that under certain compatability assumptions, the semigroup algebra of an inverse se...
We show that under certain compatability assumptions, the semigroup algebra of an inverse semigroup ...
We introduce procellular algebras, so called because they are inverse limits of finite dimensional c...
One of the central problems in the representation theory of nite groups and nite dimensional algebra...
We explain how the theory of sandwich cellular algebras can be seen as a version of cell theory for ...
In this paper we generalize cellular algebras by allowing different partial orderings relative to fi...
In this paper we study handlebody versions of classical diagram algebras, most prominently, handlebo...
In this thesis we study several algebras which are related to the bubble algebra, including the bub...
AbstractGraham and Lehrer have defined cellular algebras and developed a theory that allows in parti...
We show that, over an arbitrary field, q-rook monoid algebras are iterated inflations of Iwahori-Hec...