Defines L^p spaces via Lusin measurability for functions valued in locally convex spaces and proves density of simple functions plus dyadic approximation results in the Hausdorff case.
Measurable regularity of infinite-dimensional Lie groups based on Lusin measurability
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abstract
We discuss Lebesgue spaces $\mathcal{L}^p([a,b],E)$ of Lusin measurable vector-valued functions and the corresponding vector spaces $AC_{L^p}([a,b],E)$ of absolutely continuous functions. These can be used to construct Lie groups $AC_{L^p}([a,b],G)$ of absolutely continuous functions with values in an infinite-dimensional Lie group $G$. We extend the notion of $L^p$-regularity of infinite-dimensional Lie groups introduced by Gl\"ockner to this setting and adopt several results and tools.
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math.FA 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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On $L^p$-spaces of functions with values in locally convex spaces
Defines L^p spaces via Lusin measurability for functions valued in locally convex spaces and proves density of simple functions plus dyadic approximation results in the Hausdorff case.