Low minor faces in 3-polytopes
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Publication:1800413
DOI10.1016/j.disc.2018.08.022zbMath1397.05041OpenAlexW2889810991WikidataQ129211180 ScholiaQ129211180MaRDI QIDQ1800413
Anna O. Ivanova, Oleg V. Borodin
Publication date: 23 October 2018
Published in: Discrete Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.disc.2018.08.022
Combinatorial properties of polytopes and polyhedra (number of faces, shortest paths, etc.) (52B05) Planar graphs; geometric and topological aspects of graph theory (05C10) Structural characterization of families of graphs (05C75)
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- Describing 3-faces in normal plane maps with minimum degree 4
- Describing faces in plane triangulations
- Solution of problems of Kotzig and Grünbaum concerning the isolation of cycles in planar graphs
- The 7-cycle \(C_{7}\) is light in the family of planar graphs with minimum degree 5
- The weight of edge in 3-polytopes
- The vertex-face weight of edges in 3-polytopes
- Light graphs in families of polyhedral graphs with prescribed minimum degree, face size, edge and dual edge weight
- Triangles with restricted degrees of their boundary vertices in plane triangulations
- Triangulated \(3\)-polytopes without faces of low weight
- Cyclic degrees of 3-polytopes
- Heavy paths, light stars, and big melons
- Light subgraphs of graphs embedded in the plane. A survey
- Colorings of plane graphs: a survey
- Weight of faces in plane maps
- Low edges in 3-polytopes
- Cyclic coloration of 3-polytopes
- Height of minor faces in plane normal maps
- Unavoidable set of face types for planar maps
- Light subgraphs in planar graphs of minimum degree 4 and edge‐degree 9
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