Loxodromic elements in big mapping class groups via the Hooper-Thurston-Veech construction

Abstract

Let S be an infinite-type surface and p∈ S. We show that the Thurston-Veech construction for pseudo-Anosov elements, adapted for infinite-type surfaces, produces infinitely many loxodromic elements for the action of Mod(S;p) on the loop graph L(S;p) that do not leave any finite-type subsurface S'⊂ S invariant. Moreover, in the language of Bavard-Walker, Thurston-Veech's construction produces loxodromic elements of any weight. As a consequence of Bavard and Walker's work, any subgroup of Mod(S;p) containing two "Thurston-Veech loxodromics" of different weight has an infinite-dimensional space of non-trivial quasimorphisms.