Zero-sum partition theorems for graphs

Zero-sum partition theorems for graphs

Let q=pn be a power of an odd prime p. We show that the vertices of every graph G can be partitioned into t(q) classes V(G)=⋃t=1t(q)Vi such that the number of edges in any induced subgraph 〈Vi〉 is divisible by q, where t(q)≤32(q−1)−(2(q−1)−1)124+98, and if q=2n, then t(q)=2q−1.

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Bibliographic Details
Main Authors:	Y. Caro, I. Krasikov, Y. Roditty
Format:	Article
Language:	English
Published:	Wiley 1994-01-01
Series:	International Journal of Mathematics and Mathematical Sciences
Subjects:	zero-sum partition clique-number.
Online Access:	http://dx.doi.org/10.1155/S0161171294000992
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