Kolmogorovx2013Riesz compactness in asymptotic Lp spaces
Abstract
We extend the classical Kolmogorov-Riesz compactness theorem to the setting of asymptotic Lp spaces on Rn. These are nonlocally convex F-spaces that contain the standard Lp spaces as dense subspaces and include all measurable functions supported on sets of finite measure. In contrast with the classical Lp setting, an additional almost equiboundedness condition is needed, and we prove that together with the natural tail and translation conditions it characterizes relative compactness. We conclude with illustrative examples.
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