Nash-Williams theorem

In graph theory, the Nash-Williams theorem is a tree-packing theorem that describes how many edge-disjoint spanning trees (and more generally forests) a graph can have:

A graph G has t edge-disjoint spanning trees iff for every partition ${\textstyle V_{1},\ldots ,V_{k}\subset V(G)}$ where $V_{i}\neq \emptyset$ there are at least t(k − 1) crossing edges (Tutte 1961, Nash-Williams 1961).^[1]^[2]

For this article, we will say that such a graph has arboricity t or is t-arboric. (The actual definition of arboricity is slightly different and applies to forests rather than trees.)

^ Nash-Williams, Crispin St. John Alvah. "Decomposition of Finite Graphs Into Forests". Journal of the London Mathematical Society. 36 (1): 445–450. doi:10.1112/jlms/s1-36.1.445.
^ Diestel, Reinhard (2017-06-30). Graph theory. ISBN 9783662536216. OCLC 1048203362.

[nw61-1] Nash-Williams, Crispin St. John Alvah. "Decomposition of Finite Graphs Into Forests". Journal of the London Mathematical Society. 36 (1): 445–450. doi:10.1112/jlms/s1-36.1.445.

[:0-2] Diestel, Reinhard (2017-06-30). Graph theory. ISBN 9783662536216. OCLC 1048203362.

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