Ambrosio, Luigi.
Overview
Works: | 1 works in 5 publications in 1 languages |
---|
Titles
Transport Equations and Multi-D Hyperbolic Conservation Laws
by:
Ambrosio, Luigi.; SpringerLink (Online service)
(Language materials, printed)
Gradient flows = in metric spaces and in the space of probability measures /
by:
Ambrosio, Luigi.; Gigli, Nicola.; SpringerLink (Online service); Savare, Giuseppe.
(Language materials, printed)
New Trends on Analysis and Geometry in Metric Spaces = Levico Terme, Italy 2017 /
by:
Franchi, Bruno.; Serra Cassano, Francesco.; SpringerLink (Online service); Baudoin, Fabrice.; Rigot, Séverine.; Shanmugalingam, Nageswari.; Ambrosio, Luigi.; Savaré, Giuseppe.; Markina, Irina.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/edt]
Gradient Flows = in Metric Spaces and in the Space of Probability Measures /
by:
Ambrosio, Luigi.; Gigli, Nicola.; SpringerLink (Online service); Savare, Giuseppe.
(Language materials, printed)
Calculus of Variations and Nonlinear Partial Differential Equations = With a historical overview by Elvira Mascolo /
by:
Dacorogna, Bernard.; Marcellini, Paolo.; SpringerLink (Online service); Workshop on the Preservation of Stability under Discretization ((2001 :); Ambrosio, Luigi.
(Language materials, printed)
Gradient flows = in metric spaces and in the space of probability measures /
by:
Savare, Giuseppe.; SpringerLink (Online service); Gigli, Nicola.; Ambrosio, Luigi.
(Language materials, printed)
Introduction to measure theory and integration
by:
SpringerLink (Online service); Ambrosio, Luigi.; Prato, Giuseppe.; Mennucci, Andrea.
(Language materials, printed)
Lectures on Elliptic Partial Differential Equations
by:
Carlotto, Alessandro.; Ambrosio, Luigi.; SpringerLink (Online service); Massaccesi, Annalisa.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/aut]
Lectures on optimal transport
by:
Ambrosio, Luigi.; SpringerLink (Online service); Brué, Elia.; Semola, Daniele.
(Language materials, printed)
Nonlinear PDE's and applications = C.I.M.E. Summer School, Cetraro, Italy 2008 /
by:
Ambrosio, Luigi.; Savare, Giuseppe.; Bianchini, Stefano.; SpringerLink (Online service)
(Language materials, printed)
Modelling and optimisation of flows on networks = Cetraro, Italy 2009 /
by:
Piccoli, Benedetto.; SpringerLink (Online service); Ambrosio, Luigi.; Rascle, Michel.
(Language materials, printed)
Lectures on Optimal Transport
by:
SpringerLink (Online service); Semola, Daniele.; Brué, Elia.; Ambrosio, Luigi.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/aut]
Optimal transportation and applications = lectures given at the C.I.M.E. summer school held in Martina Franca, Italy, September 2-8, 2001 /
by:
Salsa, S.; SpringerLink (Online service); Caffarelli, Luis A.; Ambrosio, Luigi.
(Language materials, printed)
Lectures on elliptic partial differential equations
by:
Massaccesi, Annalisa.; SpringerLink (Online service); Carlotto, Alessandro.; Ambrosio, Luigi.
(Language materials, printed)
Mathematical aspects of evolving interfaces = lectures given at the C.I.M.-C.I.M.E. joint Euro-summer school held in Madeira, Funchal, Portugal, July 3-9, 2000 /
by:
Ambrosio, Luigi.; Workshop on the Preservation of Stability under Discretization ((2001 :); SpringerLink (Online service)
(Language materials, printed)
Show more
Fewer
Subjects
Geometry, Differential.
Differential equations, Parabolic.
Boundary value problems
Integrals, Generalized
Calculus of Variations and Optimization.
Metric spaces.
Probability Theory and Stochastic Processes.
Differential equations, Nonlinear
Monotone operators.
Measure and Integration.
Partial Differential Equations.
Topological Groups and Lie Groups.
Mathematical physics
Partial differential equations.
Optimization.
Ordinary Differential Equations.
Mathematics.
Analysis.
Mathematical analysis.
Differential equations, Partial.
Mathematical optimization.
Functional analysis.
Mathematics
Reaction-diffusion equations
Interfaces (Physical sciences)
Calculus of Variations and Optimal Control; Optimization.
Calculus of variations.
Lie groups.
Transportation problems (Programming)
System analysis
Differential equations, Elliptic.
Mathematical optimization
Differential Geometry.
Functional Analysis.
Evolution equations, Nonlinear.
Topological groups.
Mathematical Modeling and Industrial Mathematics.
Measure theory.
Differential equations, Partial
Measure theory
Conservation laws (Mathematics)
Analysis (Mathematics).
Calculus of variations