The chromatic class of the cartesian product of graphs (Solved)

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Posted	by:	pet_petros
	on:	December 3rd, 2007

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Conjecture Does there exist graphs $G$ and $H$ from Class 1 such that there Cartesian product is from Class 2?

It is known that there are graphs $G$ and $H$ which are from Class 2 and their product is from Class 1. Our problem asks the symmetric question. Let us also note that from the classical result of A. Kotzig we imply that there are no regular graphs $G$ and $H$ satisfying the conjecture.

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trivially false

On December 3rd, 2007 mdevos says:

If $G$ and $H$ are class 1, then $G \Box H$ is also class 1. Just choose a $\Delta(G)$ -edge coloring of $G$ and a $\Delta(H)$ -edge coloring of $H$ , and then assign each edge of $G \Box H$ the color of the edge it projects to in the appropriate projection map. This gives a proper $(\Delta(G) + \Delta(H))$ edge coloring of $G \Box H$ , and $\Delta(G \Box H) = \Delta(G) + \Delta(H)$ .