Low 5-stars at 5-vertices in 3-polytopes with minimum degree 5 and no vertices of degree from 7 to 9
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Publication:2194529
DOI10.7151/dmgt.2159zbMath1446.05024OpenAlexW2894474815WikidataQ129187716 ScholiaQ129187716MaRDI QIDQ2194529
Mikhail A. Bykov, Anna O. Ivanova, Oleg V. Borodin
Publication date: 26 August 2020
Published in: Discussiones Mathematicae. Graph Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.7151/dmgt.2159
Three-dimensional polytopes (52B10) Planar graphs; geometric and topological aspects of graph theory (05C10) Structural characterization of families of graphs (05C75)
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Cites Work
- Light and low 5-stars in normal plane maps with minimum degree 5
- Describing 4-stars at 5-vertices in normal plane maps with minimum degree 5
- Low minor 5-stars in 3-polytopes with minimum degree 5 and no 6-vertices
- Describing neighborhoods of 5-vertices in 3-polytopes with minimum degree 5 and without vertices of degrees from 7 to 11
- Low and light 5-stars in 3-polytopes with minimum degree 5 and restrictions on the degrees of major vertices
- Heights of minor 5-stars in 3-polytopes with minimum degree 5 and no vertices of degree 6 and 7
- 5-stars of low weight in normal plane maps with minimum degree 5
- Light neighborhoods of 5-vertices in 3-polytopes with minimum degree 5
- Structural Properties of Planar Maps with the Minimal Degree 5
- Short cycles of low weight in normal plane maps with minimum degree 5
- On light subgraphs in plane graphs of minimum degree five
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