Energy and helicity conservation for the generalized quasi-geostrophic equation

Abstract

In this paper, we consider the 2-D generalized surface quasi-geostrophic equation with the velocity v determined by v=R^γ-1θ. It is shown that the Lp type energy norm of weak solutions is conserved provided θ∈ Lp+1(0,T; Bγ3p+1, c(N)) for 0<γ<32 or θ∈ Lp+1(0,T; Bαp+1,∞)~for any~γ-1<α<1 with ~32≤ γ <2. Moreover, we also prove that the helicity of weak solutions satisfying ∇θ ∈ L3(0,T;B3,c(N)γ3) for 0<γ<32 or ∇θ∈ L3(0,T; Bα3,∞)~for any~γ-1<α<1 with ~32≤ γ <2 is invariant. Therefore, the accurate relationships between the critical regularity for the energy (helicity) conservation of the weak solutions and the regularity of velocity in 2-D generalized quasi-geostrophic equation are presented.