The Lp-diameter of the group of area-preserving diffeomorphisms of S2

Abstract

We show that for each p ≥ 1, the Lp-metric on the group of area-preserving diffeomorphisms of the two-sphere has infinite diameter. This solves the last open case of a conjecture of Shnirelman from 1985. Our methods extend to yield stronger results on the large-scale geometry of the corresponding metric space, completing an answer to a question of Kapovich from 2012. Our proof uses configuration spaces of points on the two-sphere, quasi-morphisms, optimally chosen braid diagrams, and, as a key element, the cross-ratio map X4(C P1) M0,4 C P1 \∞,0,1\ from the configuration space of 4 points on C P1 to the moduli space of complex rational curves with 4 marked points.