“Mean convex level set flow in general ambient manifolds”
Robert Haslhofer, University of Toronto
Robert Haslhofer, University of Toronto
Goncalo Oliveira, Duke University
Ruxandra Moraru, Department of Pure Mathematics, University of Waterloo
Jon Yard, C&O/IQC/Perimeter, University of Waterloo
Francesco Sala, Kavli Institute for the Physics and the Mathematics of the Universe
Ali Aleyasin, Université du Québec à Montréal
"The Calabi problem on edge-cone manifolds"
Chris Kottke, New College of Florida
"Compactification of monopole moduli spaces and Sen's conjecture"
Alexander Yampolsky, V.N. Karazin National University, Kharkiv, Ukraine
A vector field $\xi$ on a Riemannian manifold $(M,g)$ defines a mapping $\xi:M\to TM$ ( or $\xi:M\to T_1M$ in case of $|\xi|=1)$. Endowing $TM$ with the Sasaki metric gives rise to the Riemannian metric on $\xi(M)\subset TM$ or $\xi(M)\subset T_1M$, respectively. This idea allows to assign geometric properties from the geometry submanifold to the vector field. So, one can talk about intrinsic or extrinsic geometry of vector fields.
Jose A. Zapata, Centro de Ciencias Matematicas, Universidad Nacional Autonoma de Mexico
Changliang Wang, McMaster University