Tree tilings in random regular graphs
Abstract
We show that for every ε>0 there exists a sufficiently large d0∈ N such that for every d d0, whp the random d-regular graph G(n,d) contains a T-factor for every tree T on at most (1-ε)d/ d vertices. This is best possible since, for large enough integer d, whp G(n,d) does not contain a (1+ε)d d-star-factor. Our method gives a randomised algorithm which whp finds said T-factor and whose expected running time is O(n1+o(1)), as well as an efficient deterministic counterpart.
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