Lp measure of growth and higher order Hardy-Sobolev-Morrey inequalities

Abstract

When the growth at infinity of a function u on RN is compared with the growth of |x|s for some s∈ R, this comparison is invariably made pointwise. This paper argues that the comparison can also be made in a suitably defined Lp sense for every 1≤ p<∞ and that, in this perspective, inequalities of Hardy, Sobolev or Morrey type account for the fact that sub |x|-N/p growth of ∇ u in the % Lp sense implies sub |x|1-N/p growth of u in the Lq sense for well chosen values of q. By investigating how sub |x|s growth of ∇ ku in the Lp sense implies sub |x|s+j growth of ∇ k-ju in the Lq sense for (almost) arbitrary s∈ R and for q in a p-dependent range of values, a family of higher order Hardy/Sobolev/Morrey type inequalities is obtained, under optimal integrability assumptions. These optimal inequalities take the form of estimates for ∇ k-j(u-π u),1≤ j≤ k, where π u is a suitable polynomial of degree at most k-1, which is unique if and only if s<-k. More generally, it can be chosen independent of (s,p) when s remains in the same connected component of R \-k,...,-1\.