On growth conditions for quasiconvex integrands

Abstract

We prove that, for 1≤ p< 2, if a W1,p-quasiconvex integrand \,fN× n→R has linear growth from above on the rank-one cone, then it must satisfy this growth for all matrices in RN× n. An immediate corollary of this is, for example, that there can be no quasiconvex integrand that has genuinely superlinear p growth from above for 1<p<2, but only linear growth in rank-one directions. The key element of this proof involves constructing a Sobolev function which maps points in a cube to some one-dimensional frame, and moreover preserves boundary values. This construction is an inductive process on the dimension n, and involves using a Whitney decomposition. This technique also allows us to generalise this result for W1,p-quasiconvex integrands where 1≤ p < k≤ \n,N\.