Sur l'entropie volumique des groupes de pr\'esentation finie
Abstract
In the article BM1.22, the minimum volume entropy is introduced for each group of finite presentation and there we study some of its general properties. Another concept of minimum volume entropy for geometrically finite groups has recently been defined in BC21. In this paper, we present a comparative analysis of these two notions which coincide if the geometric dimension is equal to 1; they are quite close in dimension 2 but they differ radically in the other cases. Finally, we introduce a class of groups called soft groups, for which we calculate the minimum volume entropy defined in BM1.22. This class contains several known groups, for example, generalized Baumslag-Solitare groups as well SL(2,Z). The volume entropy defined in BC21, in general, does not apply to soft groups.
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