Alternative Theorem of Navier-Stokes Equations in R3

Abstract

We consider Cauchy problem of the incompressible Navier-Stokes equations with initial data u0∈ L1(R3) L∞(R3). There exist a maximum time interval [0,Tmax) and a unique solution u∈ C([0,Tmax); L2(R3) Lp(R3)) (∀ p>3). We find one of function class Sregular defined by scaling invariant norm pair such that Tmax=∞ provided u0∈ Sregular. Especially, \|u0\|Lp is arbitrarily large for any u0∈ Sregular and p>3. On the other hand, the alternative theorem is proved. It is that either Tmax= ∞ or Tmax∈(Tl,Tr]. Especially, Tr<Tmax<∞ is disappearing. Here the explicit expressions of Tl and Tr are given. This alternative theorem is one kind of regular criterion which can be verified by computer. If Tmax=∞, the solution u is regular for any (t,x)∈(0,∞) × R3. As t→∞, the solution is decay. On the other hand, lower bound of blow up rate of u is obtained again provided Tmax∈ (Tl,Tr].