Gigli, Nicola.
Gigli, Nicola, 1974-....
Nicola Gigli mathématicien italien
VIAF ID: 72496815 (Personal)
Permalink: http://viaf.org/viaf/72496815
Preferred Forms
- 100 1 _ ‡a Gigli, Nicola
-
- 100 1 _ ‡a Gigli, Nicola
-
- 100 1 _ ‡a Gigli, Nicola
-
-
-
- 100 1 _ ‡a Gigli, Nicola
-
- 100 1 _ ‡a Gigli, Nicola, ‡d 1974-....
-
- 100 0 _ ‡a Nicola Gigli ‡c mathématicien italien
4xx's: Alternate Name Forms (9)
5xx's: Related Names (1)
Works
Title | Sources |
---|---|
Analyse dans les espaces métriques mesurés | |
Analysis and Geometry of RCD spaces via the Schrödinger problem | |
Bakry–Émery curvature-dimension condition and Riemannian Ricci curvature bounds | |
Differential of metric valued Sobolev maps | |
Differential structure associated to axiomatic Sobolev spaces | |
Entropic Burgers’ equation via a minimizing movement scheme based on the Wasserstein metric | |
From log Sobolev to Talagrand: A quick proof | |
Gradient flows : in metric spaces and in the space of probability measures | |
Infinitesimal Hilbertianity of Locally $$\mathrm{CAT}(\kappa )$$-Spaces | |
Korevaar–Schoen’s energy on strongly rectifiable spaces | |
Local semiconvexity of Kantorovich potentials on non-compact manifolds | |
Measure theory in non-smooth spaces | |
A new transportation distance between non-negative measures, with applications to gradients flows with Dirichlet boundary conditions | |
Nonsmooth differential geometry : an approach tailored for spaces with Ricci curvature bounded from below | |
On the differential structure of metric measure spaces and applications | |
On the notion of parallel transport on RCD spaces | |
Optimal control in Wasserstein spaces | |
Quasi-Continuous Vector Fields on RCD Spaces | |
Riemannian Ricci curvature lower bounds in metric measure spaces with 𝜎-finite measure | |
Second order analysis on (P_2(M),W_2), c2011: | |
Some functional inequalities and spectral properties of metric measure spaces with curvature bounded below | |
Topics on calculus in metric measure spaces. | |
Unidimensional and Evolution Methods for Optimal Transportation |