Progress towards Nash-Williams' Conjecture on Triangle Decompositions
Abstract
Partitioning the edges of a graph into edge disjoint triangles forms a triangle decomposition of the graph. A famous conjecture by Nash-Williams from 1970 asserts that any sufficiently large, triangle divisible graph on vertices with minimum degree at least admits a triangle decomposition. In the light of recent results, the fractional version of this problem is of central importance. A fractional triangle decomposition is an assignment of non-negative weights to each triangle in a graph such that the sum of the weights along each edge is precisely 1. We show that for any graph on vertices with minimum degree at least admits a fractional triangle decomposition. Combined with results of Barber, K\"{u}hn, Lo, and Osthus, this implies that for every sufficiently large triangle divisible graph on vertices with minimum degree at least admits a triangle decomposition.
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Cite
@article{arxiv.1909.00514,
title = {Progress towards Nash-Williams' Conjecture on Triangle Decompositions},
author = {Michelle Delcourt and Luke Postle},
journal= {arXiv preprint arXiv:1909.00514},
year = {2020}
}
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30 pages