On formation of a locally self-similar collapse in the incompressible Euler equations

Abstract

The paper addresses the question of existence of a locally self-similar blow-up for the incompressible Euler equations. Several exclusion results are proved based on the Lp-condition for velocity or vorticity and for a range of scaling exponents. In particular, in N dimensions if in self-similar variables u ∈ Lp and u 1t/(1+), then the blow-up does not occur provided >N/2 or -1<≤ N/p. This includes the L3 case natural for the Navier-Stokes equations. For = N/2 we exclude profiles with an asymptotic power bounds of the form |y|-N-1+ |u(y)| |y|1-. Homogeneous near infinity solutions are eliminated as well except when homogeneity is scaling invariant.