Thurston's metric on Teichm\"uller space of semi-translation surfaces

Abstract

The present paper is composed of two parts. In the first one we define two pseudo-metrics LF and KF on the Teichmu\"uller space of semi-translation surfaces TQg( k,ε), which are the symmetric counterparts to the metrics defined by William Thurston on Tgn. We prove some nice properties of LF and KF, most notably that they are complete pseudo-metrics. In the second part we define their asymmetric analogues LFa and KFa on T Qg(1)(k, ε) and prove that their equality depends on two statements regarding 1-Lipschitz maps between polygons. We are able to prove the first statement, but the second one remains a conjecture: nonetheless, we explain why we believe it is true.