Calculus of Variations and Geometric Measure Theory
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V. De Cicco

Nonautonomous chain rules in BV with Lipschitz dependence

created by decicco on 05 Oct 2016

[BibTeX]

Accepted Paper

Inserted: 5 oct 2016
Last Updated: 5 oct 2016

Journal: Milan J. Mathematics
Year: 2016

Abstract:

The aim of this paper is to state a nonautonomous chain rule in BV with Lipschitz dependence, i.e. a formula for the distributional derivative of the composite function v(x)=B(x,u(x)), where u is a scalar function of bounded variation, B(.,t) has bounded variation and B(x,.) is only a Lipschitz continuous function. We present a survey of recent developments on the nonautonomous chain rules in BV. Formulas of this type are an useful tool especially in view to applications to lower semicontinuity for integral functional and to the conservation laws with discontinuous flux.


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