Poincar\'e-Sobolev inequalities with rearrangement-invariant norms on the entire space

Abstract

Poincar\'e-Sobolev-type inequalities involving rearrangement-invariant norms on the entire Rn are provided. Namely, inequalities of the type \|u-P\|Y(Rn)≤ C\|∇m u\|X(Rn), where X and Y are either rearrangement-invariant spaces over Rn or Orlicz spaces over Rn, u is a m-times weakly differentiable function whose gradient is in X, P is a polynomial of order at most m-1, depending on u, and C is a constant independent of u, are studied. In a sense optimal rearrangement-invariant spaces or Orlicz spaces Y in these inequalities when the space X is fixed are found. A variety of particular examples for customary function spaces are also provided.