Quasisymmetric rigidity of square Sierpinski carpets

Abstract

We prove that every quasisymmetric self-homeomorphism of the standard 1/3-Sierpi\'nski carpet S3 is a Euclidean isometry. For carpets in a more general family, the standard 1/p-Sierpi\'nski carpets Sp, p 3 odd, we show that the groups of quasisymmetric self-maps are finite dihedral. We also establish that Sp and Sq are quasisymmetrically equivalent only if p=q. The main tool in the proof for these facts is a new invariant---a certain discrete modulus of a path family---that is preserved under quasisymmetric maps of carpets.