Nonuniqueness analysis on the Navier-Stokes equation in CtLq space

Abstract

In the presence of any prescribed kinetic energy, we implement the intermittent convex integration scheme with Lq-normalized intermittent jets to give a direct proof for the existence of solution to the Navier-Stokes equation in CtLq for some uniform 2<q3 without the help of interpolation inequality. The result shows the sharp nonuniqueness that there evolve infinite nontrivial weak solutions of the Navier-Stokes equation starting from zero initial data. Furthermore, we improve the regularity of solution to be of CtWα,q in virtue of the fractional Gagliardo-Nirenberg inequalities with some 0<α1. More importantly, the proof framework provides a stepping stone for future progress on the method of intermittent convex integration due to the fact that Lq-normalized building blocks carry the threshold effect of the exponent q arbitrarily close to the critical value 3.