Free Online Productivity Tools
i2Speak
i2Symbol
i2OCR
iTex2Img
iWeb2Print
iWeb2Shot
i2Type
iPdf2Split
iPdf2Merge
i2Bopomofo
i2Arabic
i2Style
i2Image
i2PDF
iLatex2Rtf
Sci2ools
JCT
2008
2008
Quadruple systems with independent neighborhoods
A 4-graph is odd if its vertex set can be partitioned into two sets so that every edge intersects both parts in an odd number of points. Let b(n) = max n 3 + (n - ) 3 = 1 2 + o(1) n 4 denote the maximum number of edges in an n-vertex odd 4-graph. Let n be sufficiently large, and let G be an n-vertex 4-graph such that for every triple xyz of vertices, the neighborhood N(xyz) = {w : wxyz G} is independent. We prove that the number of edges of G is at most b(n). Equality holds only if G is odd with the maximum number of edges. We also prove that there is > 0 such that if a 4-graph G has minimum degree at least (1/2 - ) n 3 , then G is 2-colorable. Our results can be considered as a generalization of Mantel's theorem about triangle-free graphs, and we pose a conjecture about k-graphs for larger k as well.
Real-time TrafficEdge | JCT 2008 | Maximum Number | Odd Number |
Related Content
| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | JCT |
| Authors | Zoltán Füredi, Dhruv Mubayi, Oleg Pikhurko |
Comments (0)
Researcher Info
|
