Small Sets of Generators for Handlebody Groups

Abstract

The mapping class group of a 3-dimensional handlebody of genus g, denoted by M(Vg), is a fundamental object of study in geometric topology. Building upon the initial generators introduced by Suzuki and their explicit formulation by Takahashi, Wajnryb established that M(Vg) is generated by exactly five elements for g 2. Motivated by recent minimality results in related subgroups we investigate further reductions to this generating set. Through the use of the relations in Wajnryb's presentation, we show that for g ≥ 5, the handlebody group M(Vg) is generated by three elements, and for g ≥ 3, M(Vg) is generated by four elements, reducing Wajnryb's generating set of five elements by two and one respectively.

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