The Nash-Williams orientation theorem for graphs with countably many ends
Abstract
Nash-Williams proved in 1960 that a finite graph admits a k-arc-connected orientation if and only if it is 2k-edge-connected, and conjectured that the same result should hold for all infinite graphs, too. Progress on Nash-Williams's problem was made by C. Thomassen, who proved in 2016 that all 8k-edge-connected infinite graphs admit a k-arc connected orientation, and by the first author, who recently showed that edge-connectivity of 4k suffices for locally-finite, 1-ended graphs. In the present article, we establish the optimal bound 2k in Nash-Williams's conjecture for all locally finite graphs with countably many ends.
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