The aim of this note is to provide regularity results for Regular Lagrangian flows of Sobolev vector fields over compact metric measure spaces verifying the Riemannian curvature dimension condition. We first prove, borrowing some ideas already present in the literature, that flows generated by vector fields with bounded symmetric derivative are Lipschitz, providing the natural extension of the standard Cauchy–Lipschitz theorem to this setting. Then we prove a Lusin-type regularity result in the Sobolev case (under the additional assumption that the m.m.s. is Ahlfors regular) therefore extending the already known Euclidean result
In this paper we provide a complete analogy between the Cauchy-Lipschitz and the DiPerna-Lions theor...
In a bounded domain of Rnwith boundary given by a smooth (n −1)-dimensional manifold, we consider th...
In this paper we provide the first extension of the DiPerna–Lions theory of flows associated to Sobo...
The aim of this note is to provide regularity results for Regular Lagrangian flows of Sobolev vector...
We prove a regularity result for Lagrangian flows of Sobolev vector fields over RCD(K, N) metric mea...
We consider the regular Lagrangian flow X associated to a bounded divergence-free vector field b wit...
We establish, in a rather general setting, an analogue of DiPerna–Lions theory on well-posedness of ...
We establish new approximation results, in the sense of Lusin, of Sobolev functions by Lipschitz one...
We establish Lipschitz regularity of harmonic maps from RCD(K, N) metric measure spaces with lower R...
We establish, in a rather general setting, an analogue of DiPerna-Lions theory on well-posedness of ...
International audienceWe prove quantitative estimates for flows of vector fields subject to anisotro...
We establish new approximation results, in the sense of Lusin, of Sobolev functions by Lipschitz one...
We establish Lipschitz regularity of harmonic maps from $\mathrm{RCD}(K,N)$ metric measure spaces wi...
AbstractIn this paper we extend the DiPerna–Lions theory of flows associated to Sobolev vector field...
This thesis is concerned with the study of the structure theory of metric measure spaces (X, d, m) s...
In this paper we provide a complete analogy between the Cauchy-Lipschitz and the DiPerna-Lions theor...
In a bounded domain of Rnwith boundary given by a smooth (n −1)-dimensional manifold, we consider th...
In this paper we provide the first extension of the DiPerna–Lions theory of flows associated to Sobo...
The aim of this note is to provide regularity results for Regular Lagrangian flows of Sobolev vector...
We prove a regularity result for Lagrangian flows of Sobolev vector fields over RCD(K, N) metric mea...
We consider the regular Lagrangian flow X associated to a bounded divergence-free vector field b wit...
We establish, in a rather general setting, an analogue of DiPerna–Lions theory on well-posedness of ...
We establish new approximation results, in the sense of Lusin, of Sobolev functions by Lipschitz one...
We establish Lipschitz regularity of harmonic maps from RCD(K, N) metric measure spaces with lower R...
We establish, in a rather general setting, an analogue of DiPerna-Lions theory on well-posedness of ...
International audienceWe prove quantitative estimates for flows of vector fields subject to anisotro...
We establish new approximation results, in the sense of Lusin, of Sobolev functions by Lipschitz one...
We establish Lipschitz regularity of harmonic maps from $\mathrm{RCD}(K,N)$ metric measure spaces wi...
AbstractIn this paper we extend the DiPerna–Lions theory of flows associated to Sobolev vector field...
This thesis is concerned with the study of the structure theory of metric measure spaces (X, d, m) s...
In this paper we provide a complete analogy between the Cauchy-Lipschitz and the DiPerna-Lions theor...
In a bounded domain of Rnwith boundary given by a smooth (n −1)-dimensional manifold, we consider th...
In this paper we provide the first extension of the DiPerna–Lions theory of flows associated to Sobo...