Spontaneous symmetry breaking and finite time singularities in d-dimensional incompressible flow with fractional dissipation

Abstract

We investigate the formation of singularities in the incompressible Navier-Stokes equations in d≥ 2 dimensions with a fractional Laplacian |∇ |α. We derive analytically a sufficient but not necessary condition for solutions to remain always smooth and show that finite time singularities cannot form for α≥ αc= 1+d/2. Moreover, initial singularities become unstable for α>αc.