The "spread" of Thompson's group F

Abstract

Recall that a group G is said to be 32-generated if every non-trivial element g∈ G has a co-generator in G (i.e., an element which together with g generates G). Thompson's group V was proved to be 32-generated by Donoven and Harper in 2019. It was the first example of an infinite finitely presented non-cyclic 32-generated group. In 2022, Bleak, Harper and Skipper proved that Thompson's group T is also 32-generated. Since the abelianization of Thompson's group F is Z, it cannot be 32-generated. However, we recently proved that Thompson's group F is "almost" 32-generated in the sense that every element of F whose image in the abelianization forms part of a generating pair of Z2 is part of a generating pair of F. A natural generalization of 32-generation is the notion of spread. Recall that the spread of a group G is the supremum over all integers k such that every k non-trivial elements of G have a common co-generator in G. The uniform spread of a group G is the supremum over all integers k for which there exists a conjugacy class C⊂eq G such that every k non-trivial elements of G have a common co-generator which belongs to C. In this paper we study modified versions of these notions for Thompson's group F.