A cellular algebra with specific decomposition of the unity
Abstract
Let A be a cellular algebra over a field F with a decomposition of the identity 1A into orthogonal idempotents ei, i ∈ I (for some finite set I) satisfying some properties. We describe the entire Loewy structure of cell modules of the algebra A by using the representation theory of the algebra ei A ei for each i . Moreover, we also study the block theory of A by using this decomposition.
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