Remainder terms of Lp-Hardy inequalities with magnetic fields: the case 1<p<2

Abstract

This paper focuses on remainder estimates of the magnetic Lp-Hardy inequalities for 1<p<2. Firstly, we establish a family of remainder terms involving magnetic gradients of the magnetic Lp-Hardy inequalities, which are also new even for the classical Lp-Hardy inequalities. Secondly, we study another family of remainder terms involving logarithmic terms of the magnetic Lp-Hardy inequalities. Lastly, as a byproduct, we further obtain remainder terms of some other Lp-Hardy-type inequalities by using similar proof of our main results. Furthermore, this paper answers the open question proposed by Cazacu et al. in [Nonlinearity 37 (2024), Paper No. 035004] and can be viewed as a supplementary work of it.