English

Three dimensional pseudomanifolds on eight vertices

Geometric Topology 2008-07-18 v2 Combinatorics

Abstract

A normal pseudomanifold is a pseudomanifold in which the links of simplices are also pseudomanifolds. So, a normal 2-pseudomanifold triangulates a connected closed 2-manifold. But, normal dd-pseudomanifolds form a broader class than triangulations of connected closed dd-manifolds for d3d \geq 3. Here, we classify all the 8-vertex neighbourly normal 3-pseudomanifolds. This gives a classification of all the 8-vertex normal 3-pseudomanifolds. There are 73 such 3-pseudomanifolds, 38 of which triangulate the 3-sphere and other 35 are not combinatorial 3-manifolds. These 35 triangulate six distinct topological spaces. As a preliminary result, we show that any 8-vertex 3-pseudomanifold is equivalent by proper bistellar moves to an 8-vertex neighbourly 3-pseudomanifold. This result is the best possible since there exists a 9-vertex non-neighbourly 3-pseudomanifold (B93B^3_9 in Example 7 below) which does not allow any proper bistellar moves.

Keywords

Cite

@article{arxiv.math/0701038,
  title  = {Three dimensional pseudomanifolds on eight vertices},
  author = {Basudeb Datta and Nandini Nilakantan},
  journal= {arXiv preprint arXiv:math/0701038},
  year   = {2008}
}

Comments

19 pages, Revised version. To appear in the `International Journal of Mathematics and Mathematical Sciences'