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2. Robertson–Seymour theorem - Wikipedia

   en.wikipedia.org/wiki/Robertson–Seymour_theorem

   A similar theorem states that K 4 and K 2,3 are the forbidden minors for the set of outerplanar graphs. Although the Robertson–Seymour theorem extends these results to arbitrary minor-closed graph families, it is not a complete substitute for these results, because it does not provide an explicit description of the obstruction set for any family.

3. Friedman's SSCG function - Wikipedia

   en.wikipedia.org/wiki/Friedman's_SSCG_function

   The Robertson–Seymour theorem proves that subcubic graphs (simple or not) are well-founded by homeomorphic embeddability, implying such a sequence cannot be infinite. Then, by applying Kőnig's lemma on the tree of such sequences under extension, for each value of k there is a sequence with maximal length.

4. Graph minors theorem - Wikipedia

   en.wikipedia.org/?title=Graph_minors_theorem&...

   Print/export Download as PDF; Printable version; In other projects Appearance. move to sidebar hide. ... Redirect page. Redirect to: Robertson–Seymour theorem;

5. Graph minor - Wikipedia

   en.wikipedia.org/wiki/Graph_minor

   Another result relating the four-color theorem to graph minors is the snark theorem announced by Robertson, Sanders, Seymour, and Thomas, a strengthening of the four-color theorem conjectured by W. T. Tutte and stating that any bridgeless 3-regular graph that requires four colors in an edge coloring must have the Petersen graph as a minor. [15]

6. Graph structure theorem - Wikipedia

   en.wikipedia.org/wiki/Graph_structure_theorem

   A version of this theorem proved by Wagner (1937) states that if a graph G is both K 5-free and K 3,3-free, then G is planar. This theorem provides a "good reason" for a graph G not to have K 5 or K 3,3 as minors; specifically, G embeds on the sphere, whereas neither K 5 nor K 3,3 embed on the sphere.

7. Neil Robertson (mathematician) - Wikipedia

   en.wikipedia.org/wiki/Neil_Robertson_(mathematician)

   Robertson has won the Fulkerson Prize three times, in 1994 for his work on the Hadwiger conjecture, in 2006 for the Robertson–Seymour theorem, and in 2009 for his proof of the strong perfect graph theorem. [11] He also won the Pólya Prize (SIAM) in 2004, the OSU Distinguished Scholar Award in 1997, and the Waterloo Alumni Achievement Medal ...

8. Petersen family - Wikipedia

   en.wikipedia.org/wiki/Petersen_family

   As the Robertson–Seymour theorem shows, many important families of graphs can be characterized by a finite set of forbidden minors: for instance, according to Wagner's theorem, the planar graphs are exactly the graphs that have neither the complete graph K 5 nor the complete bipartite graph K 3,3 as minors.

9. Graph minor theorem - Wikipedia

   en.wikipedia.org/?title=Graph_minor_theorem&...

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