We develop Korevaar–Schoen’s theory of directional energies for metric-valued Sobolev maps in the case of RCD source spaces; to do so we crucially rely on Ambrosio’s concept of Regular Lagrangian Flow. Our review of Korevaar–Schoen’s spaces brings new (even in the smooth category) insights on some aspects of the theory, in particular concerning the notion of ‘differential of a map along a vector field’ and about the parallelogram identity for CAT(0) targets. To achieve these, one of the ingredients we use is a new (even in the Euclidean setting) stability result for Regular Lagrangian Flows.
Korevaar–Schoen’s directional energy and Ambrosio’s regular Lagrangian flows / Gigli, N.; Tyulenev, A.. - In: MATHEMATISCHE ZEITSCHRIFT. - ISSN 0025-5874. - 298:(2021), pp. 1221-1261. [10.1007/s00209-020-02637-y]
Korevaar–Schoen’s directional energy and Ambrosio’s regular Lagrangian flows
Gigli N.
;
2021-01-01
Abstract
We develop Korevaar–Schoen’s theory of directional energies for metric-valued Sobolev maps in the case of RCD source spaces; to do so we crucially rely on Ambrosio’s concept of Regular Lagrangian Flow. Our review of Korevaar–Schoen’s spaces brings new (even in the smooth category) insights on some aspects of the theory, in particular concerning the notion of ‘differential of a map along a vector field’ and about the parallelogram identity for CAT(0) targets. To achieve these, one of the ingredients we use is a new (even in the Euclidean setting) stability result for Regular Lagrangian Flows.| File | Dimensione | Formato | |
|---|---|---|---|
|
GigTyul.pdf
non disponibili
Tipologia:
Documento in Pre-print
Licenza:
Non specificato
Dimensione
521.53 kB
Formato
Adobe PDF
|
521.53 kB | Adobe PDF | Visualizza/Apri Richiedi una copia |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
