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Beijing–Moscow Mathematics Colloquium
December 17, 2021 12:00–13:00, Moscow, online
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Korevaar–Schoen's energy on strongly rectifiable spaces
A. I. Tyulenev
Steklov Mathematical Institute of Russian Academy of Sciences, Moscow
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Abstract:
We extend Korevaar-Schoen’s theory of metric valued Sobolev maps to cover the case of the source space being an RCD-space. When the target space is CAT(0) we establish that the corresponding energy functional is convex, lower semicontinuous and admits a unique minimizer, in line with the smooth situation. The talk is based on the joined work: Nicola Gigli, Alexander Tyulenev, “Korevaar–Schoen's energy on strongly rectifiable spaces”, Calc. Var. Partial Differential Equations, 60 (2021), 235, 54 pp., arXiv: 2002.07440
Supplementary materials:
presentation_tyulenev.pdf (404.3 Kb)
Language: English
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