Degree conditions for the partition of a graph into triangles and quadrilaterals
Abstract
For two positive integers r and s with r≥ 2s-2, if G is a graph of order 3r+4s such that d(x)+d(y)≥ 4r+4s for every xy∈ E(G), then G independently contains r triangles and s quadrilaterals, which partially prove the El-Zahar's Conjecture.
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