This paper is devoted to a proof of regularity, near the initial state, for solutions to the Cauchy–Dirichlet and obstacle problem for a class of second order differential operators of Kolmogorov type. The approach used here is general enough to allow us to consider smooth obstacles as well as non-smooth obstacles.
Titolo: | Regularity near the Initial State in the Obstacle Problem for a class of Hypoelliptic Ultraparabolic Operators |
Autore/i: | S. Polidoro; K. Nystrom; PASCUCCI, ANDREA |
Autore/i Unibo: | |
Anno: | 2010 |
Rivista: | |
Digital Object Identifier (DOI): | http://dx.doi.org/10.1016/j.jde.2010.05.020 |
Abstract: | This paper is devoted to a proof of regularity, near the initial state, for solutions to the Cauchy–Dirichlet and obstacle problem for a class of second order differential operators of Kolmogorov type. The approach used here is general enough to allow us to consider smooth obstacles as well as non-smooth obstacles. |
Data prodotto definitivo in UGOV: | 2010-08-19 10:26:32 |
Data stato definitivo: | 2017-01-02T19:19:27Z |
Appare nelle tipologie: | 1.01 Articolo in rivista |
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