A reduction of the "cycles plus K4's" problem
Abstract
Let H be a 2-regular graph and let G be obtained from H by gluing in vertex-disjoint copies of K4. The "cycles plus K4's" problem is to show that G is 4-colourable; this is a special case of the Strong Colouring Conjecture. In this paper we reduce the "cycles plus K4's" problem to a specific 3-colourability problem. In the 3-colourability problem, vertex-disjoint triangles are glued (in a limited way) onto a disjoint union of triangles and paths of length at most 12, and we ask for 3-colourability of the resulting graph.
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