Asymptotic directions, Monge-Ampere equations and the geometry of diffeomorphism groups
arXiv:math/0504556
Abstract
In this note we obtain the characterization for asymptotic directions on various subgroups of the diffeomorphism group. We give a simple proof of non-existence of such directions for area-preserving diffeomorphisms of closed surfaces of non-zero curvature. Finally, we exhibit the common origin of the Monge-Ampere equations in 2D fluid dynamics and mass transport.
10 pages, 1 fig., to appear in J. of Math. Fluid Mechanics