Characterizing the metric compactification of Lp spaces by random measures
Abstract
We present a complete characterization of the metric compactification of Lp spaces for 1≤ p < ∞. Each element of the metric compactification of Lp is represented by a random measure on a certain Polish space. By way of illustration, we revisit the Lp-mean ergodic theorem for 1 < p < ∞, and Alspach's example of an isometry on a weakly compact convex subset of L1 with no fixed points.
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