Coloring zonotopal quadrangulations of the projective space
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Publication:6664141
DOI10.1016/j.ejc.2024.104089MaRDI QIDQ6664141
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Publication date: 16 January 2025
Published in: European Journal of Combinatorics (Search for Journal in Brave)
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- Simion's type \(B\) associahedron is a pulling triangulation of the Legendre polytope
- Posets, regular CW complexes and Bruhat order
- Neighborly cubical polytopes and spheres
- Delannoy orthants of Legendre polytopes
- Every planar map is four colorable. I: Discharging
- Every planar map is four colorable. II: Reducibility
- Five-coloring maps on surfaces
- Neighborly cubical spheres and a cubical lower bound conjecture
- Map-colour theorem.
- Neighborly cubical polytopes
- Labeled \(K_{2,t}\) minors in plane graphs
- \(h^\ast\)-vectors, Eulerian polynomials and stable polytopes of graphs
- Three-coloring graphs embedded on surfaces with all faces even-sided
- Y-equivalence and rhombic realization of projective-planar quadrangulations
- Rhombus tilings of an even-sided polygon and quadrangulations on the projective plane
- Quadrangular embeddings of complete graphs and the even map color theorem
- Colouring quadrangulations of projective spaces
- Chromatic numbers of quadrangulations on closed surfaces
- Y-rotation in k-minimal quadrangulations on the projective plane
- Decompositions of Rational Convex Polytopes
- Oriented Matroids
- 4-chromatic projective graphs
- SOLUTION OF THE HEAWOOD MAP-COLORING PROBLEM
- Non-constructible complexes and the bridge index
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