Self-improving Poincar\'e-Sobolev type functionals in product spaces

Abstract

In this paper we give a geometric condition which ensures that (q,p)-Poincar\'e-Sobolev inequalities are implied from generalized (1,1)-Poincar\'e inequalities related to L1 norms in the context of product spaces. The concept of eccentricity plays a central role in the paper. We provide several (1,1)-Poincar\'e type inequalities adapted to different geometries and then show that our selfimproving method can be applied to obtain special interesting Poincar\'e-Sobolev estimates. Among other results, we prove that for each rectangle R of the form R=I1× I2 ⊂ Rn where I1⊂ Rn1 and I2⊂ Rn2 are cubes with sides parallel to the coordinate axes, we have that % equation* ( 1w(R)∫ R |f -fR|pδ,w* \,wdx)1pδ,w* ≤ c\,(1-δ)1p\,[w]A1,R1p\, (a1(R)+a2(R)), equation* % where δ ∈ (0,1), w ∈ A1,R, 1p -1 pδ,w* = δn \, 11+ [w]A1,R and ai(R) are bilinear analog of the fractional Sobolev seminorms [u]Wδ,p(Q) (See Theorem 2.18). This is a biparameter weighted version of the celebrated fractional Poincar\'e-Sobolev estimates with the gain (1-δ)1p due to Bourgain-Brezis-Minorescu.