On the stability phenomenon of the Navier-Stokes type Equations for Elliptic Complexes

Abstract

Let X be a Riemannian n-dimensional smooth compact closed manifold, n≥ 2, Ei be smooth vector bundles over X and \Ai,Ei\ be an elliptic differential complex of linear first order operators. We consider the operator equations, induced by the Navier-Stokes type equations associated with \Ai,Ei\ on the scale of anisotropic H\"older spaces over the layer X × [0,T] with finite time T > 0. Using the properties of the differentials Ai and parabolic operators over this scale of spaces, we reduce the equations to a nonlinear Fredholm operator equation of the form (I+K) u = f, where K is a compact continuous operator. It appears that the Fr\'echet derivative (I+K)' is continuously invertible at every point of each Banach space under the consideration and the map (I+K) is open and injective in the space.