Endpoint Sobolev inequalities for vector fields and cancelling operators

Abstract

The injectively elliptic vector differential operators A (D) from V to E on Rn such that the estimate \[ D uLn/(n - ) (Rn) A (D) uL1 (Rn) \] holds can be characterized as the operators satisfying a cancellation condition \[ ∈ Rn \0\ A ()[V] = \0\\;. \] These estimates unify existing endpoint Sobolev inequalities for the gradient of scalar functions (Gagliardo and Nirenberg), the deformation operator (Korn-Sobolev inequality by M.J. Strauss) and the Hodge complex (Bourgain and Brezis). Their proof is based on the fact that A (D) u lies in the kernel of a cocancelling differential operator.