Decompositions of Group Algebras as a Direct Sum of Projective Indecomposable Modules and of Blocks in Positive Characteristic
Abstract
The dissertation focuses on decomposing a group algebra kG over a field of positive characteristic into a direct sum of projective indecomposable modules. Such a decomposition is obtained together with the Artin--Wedderburn Theorem. The main goal of the dissertation is to explicitly decompose given group algebras as a direct sum of their projective indecomposable modules. To achieve this, we determine the radical series of each projective indecomposable module of the given group algebras. For a group algebra over characteristic p, each projective indecomposable module has a simple head that is isomorphic to its socle. Projective covers and injective envelopes are used to construct these modules. A cyclic group algebra is uniserial, and a p-group algebra over characteristic p is itself a projective indecomposable module. Using these properties, we explicitly find all projective indecomposable modules for the following group algebras over characteristic 2: the Klein four-group, the alternating group A4, and the alternating group A5. Their relationships play an important role in this process. Since p-group algebras have trivial head and trivial socle, the Klein four-group algebra has a corresponding radical series. Its decomposition into a direct sum of projective indecomposable modules is described explicitly, and the Cartan matrix of a group algebra is obtained by calculating the multiplicities of simples in its projective indecomposable modules. The topic is then extended slightly by considering the unique decomposition of a group algebra into a direct sum of particular modules known as blocks. For kA4, the primitive orthogonal idempotents are calculated, and since kA4 has one block, it is equal to its block decomposition. For kA5, we show that there are two blocks, determined by checking the nonzero entries in its Cartan matrix.
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