Limiting Sobolev inequalities for vector fields and canceling linear differential operators

Abstract

The estimate [ Dk-1uLn/(n-1) A(D)u L1 ] is shown to hold if and only if (A(D)) is elliptic and canceling. Here (A(D)) is a homogeneous linear differential operator (A(D)) of order (k) on (Rn) from a vector space (V) to a vector space (E). The operator (A(D)) is defined to be canceling if [ ∈ Rn 0 A()[V]=0.] This result implies in particular the classical Gagliardo-Nirenberg-Sobolev inequality, the Korn-Sobolev inequality and Hodge-Sobolev estimates for differential forms due to J. Bourgain and H. Brezis. In the proof, the class of cocanceling homogeneous linear differential operator (L(D)) of order (k) on (Rn) from a vector space (E) to a vector space (F) is introduced. It is proved that (L(D)) is cocanceling if and only if for every (f ∈ L1(Rn; E)) such that (L(D)f=0), one has (f ∈ W-1, n/(n-1)(Rn; E)). The results extend to fractional and Lorentz spaces and can be strengthened using some tools of J. Bourgain and H. Brezis.