A cellular algebra with specific decomposition of the unity

Mufida M. Hmaida

Published 2017-01-29Version 1

Let $ \mathbb{A}$ be a cellular algebra over a field $\mathbb{F}$ with a decomposition of the identity $ 1_{\mathbb{A}} $ into orthogonal idempotents $ e_i$, $i \in I$ (for some finite set $I$) satisfying some properties. We describe the entire Loewy structure of cell modules of the algebra $ \mathbb{A} $ by using the representation theory of the algebra $ e_i \mathbb{A} e_i $ for each $ i $. Moreover, we also study the block theory of $\mathbb{A}$ by using this decomposition.