The sharp Adams type inequalities in the hyperbolic spaces under the Lorentz-Sobolev norms

Abstract

Let 2≤ m < n and q ∈ (1,∞), we denote by WmL nm,q( Hn) the Lorentz-Sobolev space of order m in the hyperbolic space Hn. In this paper, we establish the following Adams inequality in the Lorentz-Sobolev space Wm L nm,q( Hn) \[ u∈ WmL nm,q( Hn),\, \|∇gm u\| nm,q≤ 1 ∫ Hn nm,q(βn,m qq-1 |u| qq-1) dVg < ∞ \] for q ∈ (1,∞) if m is even, and q ∈ (1,n/m) if m is odd, where βn,mq/(q-1) is the sharp exponent in the Adams inequality under Lorentz-Sobolev norm in the Euclidean space. To our knowledge, much less is known about the Adams inequality under the Lorentz-Sobolev norm in the hyperbolic spaces. We also prove an improved Adams inequality under the Lorentz-Sobolev norm provided that q≥ 2n/(n-1) if m is even and 2n/(n-1) ≤ q ≤ nm if m is odd, \[ u∈ WmL nm,q( Hn),\, \|∇gm u\| nm,qq -λ \|u\| nm,qq ≤ 1 ∫ Hn nm,q(βn,m qq-1 |u| qq-1) dVg < ∞ \] for any 0< λ < C(n,m,n/m)q where C(n,m,n/m)q is the sharp constant in the Lorentz-Poincar\'e inequality. Finally, we establish a Hardy-Adams inequality in the unit ball when m≥ 3, n≥ 2m+1 and q ≥ 2n/(n-1) if m is even and 2n/(n-1) ≤ q ≤ n/m if m is odd \[ u∈ WmL nm,q( Hn),\, \|∇gm u\| nm,qq -C(n,m, nm)q \|u\| nm,qq ≤ 1 ∫ Bn (βn,m qq-1 |u| qq-1) dx < ∞. \]