<div class="csl-bib-body">
<div class="csl-entry">Ricco, S. (2023, July 11). <i>A characterization for solutions to autonomous obstacle problems with general growth"</i> [Poster Presentation]. Hausdorff School “Analysis of PDEs: Variational and Geometric Perspectives,” Bonn, Germany.</div>
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dc.identifier.uri
http://hdl.handle.net/20.500.12708/189025
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dc.description.abstract
Obstacle problems are by now well studied in the context of regularity theory, but a still pending issue is the relation between minima and extremals. The regularity of the solutions is often proved thanks to the fact that the minimizers are extremals too, i.e. they solve a variational inequality related to the problem. While in the context of standard growth conditions the literature is well established, under more general growth hypotheses there are still issues in this regard. Considering an autonomous obstacle problem, whose Lagrangian satisfies proper hypotheses of convexity and superlinearity at infinity, I will present a characterization for the unique solution in terms of extremality and a primal-dual formulation of the problem.
en
dc.language.iso
en
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dc.subject
Obstacle problem
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dc.subject
Convex analysis
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dc.subject
Variational inequality
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dc.subject
General growth
en
dc.title
A characterization for solutions to autonomous obstacle problems with general growth"