The packing spectrum for Birkhoff averages on a self-affine repeller

Abstract

We consider the multifractal analysis for Birkhoff averages of continuous potentials on a self-affine Sierpi\'nski sponge. In particular, we give a variational principal for the packing dimension of the level sets. Furthermore, we prove that the packing spectrum is concave and continuous. We give a sufficient condition for the packing spectrum to be real analytic, but show that for general H\"older continuous potentials, this need not be the case. We also give a precise criterion for when the packing spectrum attains the full packing dimension of the repeller. Again, we present an example showing that this is not always the case.