Diffeomorphisms of manifolds with nonsingular Poincaré flows

We consider a description of membranes by (2, 1)-dimensional field theory, or alternatively a description of irrotational, isentropic fluid motion by a field theory in any dimension. We show that these Galileo-invariant systems, as well as others related to them, admit a peculiar diffeomorphism symm

Intrinsic stochastic calculus on manifolds for processes with jumps is used to prove global existence, uniqueness, and isometry for parallel transport of tangent vectors along the paths induced by a stochastic flow of diffeomorphisms driven by a Levy process.

We consider a SDE with a smooth multiplicative non-degenerate noise and a possibly unbounded Hölder continuous drift term. We prove the existence of a global flow of diffeomorphisms by means of a special transformation of the drift of Itô-Tanaka type. The proof requires non-standard elliptic estimat