On Cyclic $G$-Designs where $G$ is the One-Point Union of Two Cycles

Brewington!, K.; Bunge, R. C.; Cross, L. J.; Zanati, El-; K. Pawlak, C.; L. Smith, J.; M. Zeppetello, S.

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Journal of Combinatorial Mathematics and Combinatorial Computing

Volume 083
Pages: 261-289

Research article

On Cyclic $G$ -Designs where $G$ is the One-Point Union of Two Cycles

^¹, ^², ^², ^², ^², ^¹, ^²

¹Department of Mathematics, Computer Science & Physics Morehead State University Morehead, KY 40351

²Department of Mathematics Illinois State University Normal, IL 61790-4520

Published: 30/11/2012

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Abstract

Let $G$ be the one-point union of two cycles and suppose $G$ has $n$ edges. We show via various graph labelings that there exists a cyclic $G$ -decomposition of $K_{2 n t + 1}$ for every positive integer $t$ .

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Journal of Combinatorial Mathematics and Combinatorial Computing

On Cyclic $G$ -Designs where $G$ is the One-Point Union of Two Cycles

Abstract

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Contents

Journal of Combinatorial Mathematics and Combinatorial Computing

On Cyclic G-Designs where G is the One-Point Union of Two Cycles

Abstract

Information

Guidelines

CP Initiatives

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On Cyclic $G$ -Designs where $G$ is the One-Point Union of Two Cycles