Decompositions of complete graphs into cycles of arbitrary lengths
Abstract
We show that the complete graph on n vertices can be decomposed into t cycles of specified lengths m1,…,mt if and only if n is odd, 3≤ mi≤ n for i=1,…,t, and m1+·s+mt= n2. We also show that the complete graph on n vertices can be decomposed into a perfect matching and t cycles of specified lengths m1,…,mt if and only if n is even, 3≤ mi≤ n for i=1,…,t, and m1+…+mt= n2- n2.
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