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Abstract We introduce the stable module -category for groups of type as an enhancement of the stable category defined by N. Mazza and P. Symonds. For groups of type that act on a tree, we show that the stable module -category decomposes in terms of the associated graph of groups. For groups that admit a finite-dimensional cocompact model for the classifying space for proper actions, we exhibit a decomposition in terms of the stable module -categories of their finite subgroups. We use these decompositions to provide methods to compute the Picard group of the stable module category. In particular, we provide a description of the Picard group for countable locally finite p-groups.
Juan Omar Gómez (Wed,) studied this question.
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