Extended Caffarelli-Kohn-Nirenberg inequalities, and remainders, stability, and superweights for Lp-weighted Hardy inequalities

Abstract

In this paper we give an extension of the classical Caffarelli-Kohn-Nirenberg inequalities: we show that for 1<p,q<∞, 0<r<∞ with p+q≥ r, δ∈[0,1][r-qr,pr] with δ rp+(1-δ)rq=1 and a, b, c∈R with c=δ(a-1)+b(1-δ), and for all functions f∈ C0∞(Rn\0\) we have \||x|cf\|Lr(Rn) ≤ |pn-p(1-a)|δ \||x|a∇ f\|δLp(Rn) \||x|bf\|1-δLq(Rn) for n≠ p(1-a), where the constant |pn-p(1-a)|δ is sharp for p=q with a-b=1 or p≠ q with p(1-a)+bq≠0. In the critical case n=p(1-a) we have \||x|cf\|Lr(Rn) ≤ pδ \||x|a|x|∇ f\|δLp(Rn) \||x|bf\|1-δLq(Rn). Moreover, we also obtain anisotropic versions of these inequalities which can be conveniently formulated in the language of Folland and Stein's homogeneous groups. Consequently, we obtain remainder estimates for Lp-weighted Hardy inequalities on homogeneous groups, which are also new in the Euclidean setting of Rn. The critical Hardy inequalities of logarithmic type and uncertainty type principles on homogeneous groups are obtained. Moreover, we investigate another improved version of Lp-weighted Hardy inequalities involving a distance and stability estimates. We also establish sharp Hardy type inequalities in Lp, 1<p<∞, with superweights, i.e. with the weights of the form (a+b|x|α)βp|x|m allowing for different choices of α and β.