Distance Stability for the Integral Hardy and Carleman Inequalities

Abstract

We study stability forms of two classical integral inequalities: Hardy's integral inequality and the integral Carleman inequality, also known as the Pólya--Knopp inequality. The sharp constants in these two inequalities are (p')p and e, respectively, but neither inequality has a non-trivial extremizer in its natural function space. Their formal extremal functions are c x-1/p and c/x, respectively. We first derive a deficit identity for Hardy's integral inequality. In particular, when p=2, the deficit is exactly a squared norm. We then prove a distance stability estimate for the integral Carleman inequality, whose remainder term directly measures a local weighted Hellinger-type distance from the family \c/x:c0\. Together these results illustrate the same stability phenomenon: although the classical integral inequalities have no genuine extremizers, their deficits still measure the deviation from the corresponding families of virtual extremals.