Add to ORKGnoneFor 66 years, research on the four-color theorem was dominated by Tait's Hamiltonian graph conjecture: any cubic polyhedral graph has a Hamiltonian cycle. In a graph, cubic means that every vertex is incident with exactly three edges. Any planar graph can be made cubic by drawing a small circle around any vertex with valence greater than three and eliminating the original vertex. Tutte, in 1946, found the first counterexample to Tait's conjecture. Tait's method turns a Hamiltonian cycle into a four-coloring. 1. Alternately color the edges of the cycle blue and purple. Color the other edges red. 2. Throw out red edges, and color the resulting polygon blue. 3. Throw out blue edges, and color the resulting polygon(s) red. 4. Overlay the p...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
AbstractThis paper is an introduction to the work of Spencer-Brown on the Four-Color Theorem
The famous four color theorem states that for all planar graphs, every vertex can be assigned one of...
Certainly any mathematical theorem concerning the coloring of maps would be relevant and widely appl...
AbstractThe four-colour theorem, that every loopless planar graph admits a vertex-colouring with at ...
AbstractThe four-colour theorem, that every loopless planar graph admits a vertex-colouring with at ...
We study graph colorings of the form made popular by the four-color theorem. Proved by Appel and Hak...
We study graph colorings of the form made popular by the four-color theorem. Proved by Appel and Hak...
In this note we are proving the four conjecture for planar graphs. The proof follows the Euler...
M.Sc.Within the field of Graph Theory the many ways in which graphs can be coloured have received a ...
very planar map of connected countries can be colored using four colors in such a way that countries...
The Four Color Theorem says that the faces (or vertices) of a plane graph may be colored with four c...
The four-colour conjecture (4CC) is a question that asks whether any map can be coloured using only ...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
AbstractThis paper is an introduction to the work of Spencer-Brown on the Four-Color Theorem
The famous four color theorem states that for all planar graphs, every vertex can be assigned one of...
Certainly any mathematical theorem concerning the coloring of maps would be relevant and widely appl...
AbstractThe four-colour theorem, that every loopless planar graph admits a vertex-colouring with at ...
AbstractThe four-colour theorem, that every loopless planar graph admits a vertex-colouring with at ...
We study graph colorings of the form made popular by the four-color theorem. Proved by Appel and Hak...
We study graph colorings of the form made popular by the four-color theorem. Proved by Appel and Hak...
In this note we are proving the four conjecture for planar graphs. The proof follows the Euler...
M.Sc.Within the field of Graph Theory the many ways in which graphs can be coloured have received a ...
very planar map of connected countries can be colored using four colors in such a way that countries...
The Four Color Theorem says that the faces (or vertices) of a plane graph may be colored with four c...
The four-colour conjecture (4CC) is a question that asks whether any map can be coloured using only ...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
The author has investigated the properties of Hamiltonian circuits in a class of trivalent planar gr...
AbstractThis paper is an introduction to the work of Spencer-Brown on the Four-Color Theorem