Renormalization and a-priori bounds for Leray self-similar solutions to the generalized mild Navier-Stokes equations

Abstract

We demonstrate that the problem of existence of Leray self-similar blow up solutions in a generalized mild Navier-Stokes system with the fractional Laplacian (-)γ/2 can be stated as a fixed point problem for a "renormalization" operator. We proceed to construct a-priori bounds, that is a renormalization invariant precompact set in an appropriate weighted Lp-space. As a consequence of a-priori bounds, we prove existence of renormalization fixed points for d 2 and d<γ <2 d+2, and existence of non-trivial Leray self-similar mild solutions in C∞([0,T),(Hk)d (Lp)d), k>0, p 2, whose (Lp)d-norm becomes unbounded in finite time T.