On subspaces of ∞ and extreme contraction in L(X, ∞n)
Abstract
We investigate different possiblities of subspaces of the space ∞ in terms of whether the subspaces are polyhedral or not. We further study finite-dimensional subspaces of ∞ which are of the form ∞n form some n ≥ 2. As an application of the results we compute the number of extreme contractions for a class of the space of bounded linear operators. In particular we find the number of extreme contractions of L(X, ∞n), where X is a finite-dimensional polyhedral space.
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