Maximum independent sets in direct products of cycles or trees with arbitrary graphs
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Publication:891314
DOI10.7151/dmgt.1837zbMath1327.05265OpenAlexW2573060397MaRDI QIDQ891314
Publication date: 17 November 2015
Published in: Discussiones Mathematicae. Graph Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.7151/dmgt.1837
Paths and cycles (05C38) Vertex subsets with special properties (dominating sets, independent sets, cliques, etc.) (05C69)
Uses Software
Cites Work
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- Structure of independent sets in direct products of some vertex-transitive graphs
- Independent sets in direct products of vertex-transitive graphs
- The fractional version of Hedetniemi's conjecture is true
- The \(k\)-independence number of direct products of graphs and Hedetniemi's conjecture
- A survey on Hedetniemi's conjecture
- Graph products and the chromatic difference sequence of vertex-transitive graphs
- On the independence number of the strong product of cycle-powers
- Graph products, Fourier analysis and spectral techniques
- Independence and coloring properties of direct products of some vertex-transitive graphs
- Primitivity and independent sets in direct products of vertex-transitive graphs
- Projectivity and independent sets in powers of graphs
- Notes on the independence number in the Cartesian product of graphs
- Applications of product colouring
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