New Regularity Criteria for Navier-Stokes and SQG Equations in Critical Spaces

Abstract

In this paper, we investigate some priori estimates to provide the critical regularity criteria for incompressible Navier-Stokes equations on R3 and super critical surface quasi-geostrophic equations on R2. Concerning the Navier-Stokes equation, we demonstrate that a Leray-Hopf solution u is regular if u∈ LT21-α B-α∞,∞(R3), or u in Lorentz space LTp,r B-1+2p∞,∞(R3), with 4≤ p≤ r<∞. Additionally, an alternative regularity condition is expressed as u∈ LT21-α B-α∞,∞(R3)+LT∞B-1∞,∞(R3)(α∈(0,1)), contingent upon a smallness assumption on the norm LT∞B-1∞,∞. For the SQG equation, we derive that a Leray-Hopf weak solution θ∈ LTα C1-α+ε(R2) is smooth for any small enough. Similar to the case of Navier-Stokes equation, we derive regularity criterion in more refined spaces, i.e. Lorentz spaces LTαε,rC1-α+ε(R2) and addition of two critical spaces LTαεC1-α+ε(R2)+LT∞C1-α(R2), with smallness assumption on LT∞C1-α(R2).