Equitable partition of graphs into induced linear forests
Abstract
It is proved that the vertex set of any simple graph G can be equitably partitioned into k subsets for any integer k≥\(G)+12,|G|4\ so that each of them induces a linear forest.
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It is proved that the vertex set of any simple graph G can be equitably partitioned into k subsets for any integer k≥\(G)+12,|G|4\ so that each of them induces a linear forest.