Type: Article
Publication Date: 1954-01-01
Citations: 1023
DOI: https://doi.org/10.4153/cjm-1954-010-9
Summary Two polynomials θ ( G, n ) and ϕ ( G, n ) connected with the colourings of a graph G or of associated maps are discussed. A result believed to be new is proved for the lesser-known polynomial ϕ ( G, n ). Attention is called to some unsolved problems concerning ϕ ( G, n ) which are natural generalizations of the Four Colour Problem from planar graphs to general graphs. A polynomial χ ( G, x, y ) in two variables x and y , which can be regarded as generalizing both θ ( G, n ) and ϕ ( G, n ) is studied. For a connected graph χ ( G, x, y ) is defined in terms of the “spanning” trees of G (which include every vertex) and in terms of a fixed enumeration of the edges.
| Action | Title | Year | Authors |
|---|---|---|---|
| + PDF Chat | A logical expansion in mathematics | 1932 |
Hassler Whitney |
| + PDF Chat | Chromatic polynomials | 1946 |
George D. Birkhoff Drew Lewis |