On the complex constant rank condition and inequalities for differential operators

In this note, we study the complex constant rank condition for differential operators and its implications for coercive differential inequalities. These are inequalities of the form parallel to Au parallel to(Lp) <= parallel to Au parallel to(Lq), for exponents 1 <= p, q < infinity and homogeneous constant-coefficient differential operators A and A. The functions u : Omega -> R-d. are defined on open and bounded sets Omega subset of R-N. satisfying certain regularity assumptions. Depending on the order of A and A, such an inequality might be viewed as a generalisation of either Korn's or Sobolev's inequality, respectively. In both cases, as we are on bounded domains, we assume that the Fourier symbol of A satisfies an algebraic condition, the complex constant rank property.

Automated summary

This note investigates the complex constant rank condition for differential operators and its implications for coercive differential inequalities. Depending on the order of the operators, such inequalities can be viewed as generalizations of either Korn's inequality or Sobolev's inequality.