MANIFOLD POSETS
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概要
- 論文の詳細を見る
A poset P is called an n-manifold poset if its order complex Δ(P), that is, the simplicial complex consisting of all the chains in P is a triangulation of some n-manifold. After showing several general facts on n-manifold posets, we shall characterize 1, 2 and 3-manifold posets in terms of only combinatorics of posets.
- 横浜国立大学の論文
著者
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Tsuchiya Morimasa
Department Of Mathematical Sciences Faculty Of Science Tokai University
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NEGAMI Seiya
Department of Mathematics, Faculty of Education, Yokohama National University
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Negami Seiya
Department Of Mathematics Faculty Of Education And Human Sciences Yokohama National University
関連論文
- Remarks on Relations Between Upper Bound Graphs and Double Bound Graphs
- On double bound graphs whose complements are also double bound graphs
- The Order Complexes on the 2-sphere
- MANIFOLD POSETS
- A Note on Contractibility of Posets
- Topological Graph Theory from Japan
- Diagonal Transformations of Graphs on Closed Surfaces
- Another Proof of Bela Bollobas' Theorem on Edge Disjoint Cycles
- Branched Coverings of PL Involuations on 3-Manifolds
- PROJECTIVE-PLANAR GRAPHS WITH EVEN DUALS
- On a Hereditary Poset
- On Regularity of Upper Bound Graphs and Double Bound Graphs
- On Unstable Graphs
- POLYNOMIAL INVARIANTS OF EMBEDDINGS OF GRAPHS ON CLOSED SURFACES