On the refined analyticity radius of 3-D generalized Navier-Stokes equations

Abstract

We analyze the instantaneous growth of analyticity radius for three dimensional generalized Navier-Stokes equations. For the subcritical Hγ( R3) case with γ>12, we prove that there exists a positive time t0 so that for any t∈]0, t0], the radius of analyticity of the solution u satisfies the pointwise-in-time lower bound rad(u)(t) (2γ-1)t(| t|+| t|+Kt), where Kt ∞ as t 0+. This in particular gives a nontrivial improvement of the previous result by Herbst and Skibsted in HS for the case γ∈ ]1/2,3/2[ and also settles the decade-long open question in HS, namely, whether or not t 0+ rad(u)(t)t| t| 2γ-1 for all γ 32. For the critical case H 12( R3), we prove that there exists t1>0 so that for any t∈ ]0, t1], rad(u)(t) λ(t)t with λ(t) satisfying t 0+λ(t)=∞.