On subspaces of invariant vectors
Abstract
Let Xπ be the subspace of fixed vectors for a uniformly bounded representation π of a group G on a Banach space X. We study the problem of the existence and uniqueness of a subspace Y that complements Xπ in X. Similar questions for G-invariant complement to Xπ are considered. We prove that every non-amenable discrete group G has a representation with non-complemented Xπ and find some conditions that provide an G-invariant complement. A special attention is given to representations on C(K) that arise from an action of G on a metric compact K.
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