# Speakers

• L. Alías

Geometric applications of the generalized Omori-Yau maximum principle

• F. Codá

Deforming three-manifolds with positive scalar curvature

• T. Colding

Singularities of mean curvature flow

• E. García-Rio

Osserman manifolds

• M. Ghomi

Four-vertex theorems in Riemannian surfaces

• C. Gorodski

Homogeneous isoparametric submanifolds of type An in Hilbert spaces

• J. Lauret

Homogeneous Ricci flows and solitons

• J. Lira

Conformal Killing graphs with prescribed mean curvature

• B. Meeks

The local and global geometry of embedded minimal and CMC surfaces in 3-manifolds.

• C. Olmos

Submanifolds and Berger-type theorems

• G. Paternain

On the stability condition in Symplectic Topology

• P. Piccione

Bifurcation of Constant Mean Curvature Tori in Euclidean Spheres

• H. Rosenberg

The geometry of surfaces in 3-dimensional homogeneous spaces

• N. Sesum

Conditions on extending the Ricci flow and the mean curvature flow

• R. Tojeiro

Genuine Deformations of Submanifolds

• B. Wilking

Sharp estimates for the Ricci flow

• J. Wolf

The geometry of complex manifolds related to group representation theory

• W. Ziller

Manifolds with Positive Sectional Curvature