In this paper we dene jump set and approximate limits for BV functions on Wiener spaces and show that the weak gradient admits a decomposition similar to the nite dimensional case. We also dene the SBV class of functions of special bounded variation and give a characterisation of SBV via a chain rule and a closure theorem. We also provide a characterisation of BV functions in terms of the short-time behaviour of the Ornstein-Uhlenbeck semigroup following an approach due to Ledoux.
Some fine properties of BV functions on Wiener spaces
AMBROSIO, Luigi;MIRANDA, Michele;PALLARA, Diego
2015
Abstract
In this paper we dene jump set and approximate limits for BV functions on Wiener spaces and show that the weak gradient admits a decomposition similar to the nite dimensional case. We also dene the SBV class of functions of special bounded variation and give a characterisation of SBV via a chain rule and a closure theorem. We also provide a characterisation of BV functions in terms of the short-time behaviour of the Ornstein-Uhlenbeck semigroup following an approach due to Ledoux.File in questo prodotto:
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[22993274 - Analysis and Geometry in Metric Spaces] Some Fine Properties of BV Functions on Wiener Spaces.pdf
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