Monday, April 30, 2012

1204.6161 (Pierre Collet et al.)

Trees of nuclei and bounds on the number of triangulations of the 3-ball    [PDF]

Pierre Collet, Jean-Pierre Eckmann, Maher Younan
Based on the work of Durhuus-J{\'o}nsson and Benedetti-Ziegler, we revisit the question of the number of triangulations of the 3-ball. We introduce a notion of nucleus (a triangulation of the 3-ball without internal nodes, and with each internal face having at most 1 external edge). We show that every triangulation can be built from trees of nuclei. This leads to a new reformulation of Gromov's question: We show that if the number of rooted nuclei with $t$ tetrahedra has a bound of the form $C^t$, then the number of rooted triangulations with $t$ tetrahedra is bounded by $C_*^t$.
View original: http://arxiv.org/abs/1204.6161

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