Finite time blow-up for the hypodissipative Navier Stokes equations with a force in L1t Cx1,ε L∞tLx2
Abstract
In this work we establish the formation of singularities of classical solutions with finite energy of the forced fractional Navier Stokes equations where the dissipative term is given by |∇|α for any α∈ [0, α0) (α0 = 22-879 > 0). We construct solutions in R3× [0,T] with a finite T>0 and with an external forcing which is in L1t([0, T]) Cx1,ε L∞tLx2, such that on the time interval 0 t < T, the velocity u is in the space C∞ L2 and such that as the time t approaches the blow-up moment T, the integral ∫0t |∇ u| ds tends to infinity.
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