Edge-decompositions of O(m)-edge-connected graphs into isomorphic copies of a fixed tree of size m

Abstract

In this paper, we show that every O(m)-edge-connected simple graph G of size divisible by m with minimum degree at least 2O(m) has an edge-decomposition into isomorphic copies of any given tree T of size m. Moreover, the minimum degree condition can be dropped for graphs G with girth greater than the diameter of T. These results improve two results due to Bensmail, Harutyunyan, Le, Merker, and Thomass\'e (2017) and Merker (2017) who gave a factorial upper bound on the necessary edge-connectivity.

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