On the universality of the incompressible Euler equation on compact manifolds, II. Non-rigidity of Euler flows

Abstract

The incompressible Euler equations on a compact Riemannian manifold (M,g) take the form align* ∂t u + ∇u u &= - gradg p \\ divg u &= 0, align* where u: [0,T] (T M) is the velocity field and p: [0,T] C∞(M) is the pressure field. In this paper we show that if one is permitted to extend the base manifold M by taking an arbitrary warped product with a torus, then the space of solutions to this equation becomes "non-rigid'"in the sense that a non-empty open set of smooth incompressible flows u: [0,T] (T M) can be approximated in the smooth topology by (the horizontal component of) a solution to these equations. We view this as further evidence towards the "universal" nature of Euler flows.