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Events

Conference
UMI-SIMAI-PTM
Joint Meeting

[Section 17]
Wrozclaw, Polonia
September 17-20, 2018

UIMP-RSME Santaló
Summer School 2018
Interactions between
PDE and probability

UIMP, Santander (Spain)
August 13-17, 2018

BIRS Workshop
Advanced Developments for Surface and Interface Dynamics - Analysis and Computation (18w5033)
June 17-22, 2018
BIRS, Banff, Canada

Advanced Courses
Lectures on
PDEs and Geometry

UAM Madrid (Spain)

Past Events

Conference
Nonlinear diffusion and free boundary problems. A conference on the occasion of the 70th anniversary of Juan Luis Vázquez
UAM Madrid (Spain)
May 17-19, 2017

Summer Course
CIME 2016
Nonlocal and nonlinear diffusions and interactions
New methods and directions

Cetraro (Italy)
July 4-8, 2016

Postal Address...


Departamento de Matemáticas
Universidad Autónoma de Madrid
Campus de Cantoblanco
28049 Madrid

...and more


Building 17 (ex C-XV), Office 405

[email] matteo.bonforte@uam.es
    [phone]             (+34) 91 497 69 32
[fax]    (+34) 91 497 48 89

Actual Position

I am a Professor (Contratado Doctor, I3) of the Departamento de Matemáticas at the Universidad Autónoma de Madrid.

I am PI1 of the Spanish research group MTM2017-85757-P, "Ecuaciones No Lineales y No Locales. Difusión y Geometría." - "Nonlinear and Nonlocal Equations. Diffusion and Geometry", PI2 Mar Gonzalez and founded by MINECO (Spanish Government). I am also PI2 of the Spanish research group MTM2014-52240-P, "Ecuaciones de Difusión No Lineales y Aplicaciones" - "Nonlinear Diffusion Equations and Applications" - PI1 Juan Luis Vázquez and founded by MINECO (Spanish Government).

I am member of the editorial board of the Journal Nonlinear Analysis.

In this academic year 2017/2018 I am teaching two courses at UAM: Advanced Course in Partial Differential Equations for students of the Master in Mathematics and Mathematical Modeling for students of the 3rd-4th year of Mathematics.




Research Interests

Nonlinear and/or nonlocal partial differential equations:
asymptotic properties, rates of convergence to equilibrium, regularity and Harnack inequalities for degenerate and singular nonlinear -and also nonlocal- parabolic PDE in the Euclidean setting and on Riemannian manifolds. Nonlinear (fast) diffusion flows of porous medium or p-Laplacian type. Total variation flow.

Functional inequalities (also with weights): Sobolev, Gagliardo-Nirenberg, Hardy, Poincaré, Logarithmic Sobolev, Caffarelli-Kohn-Nirenberg [...] and their application to PDE.

Entropy methods for nonlinear flows, in the Euclidean setting and on Riemannian manifolds: a bridge from functional inequalities to PDE and geometry.