Colorings with neighborhood parity condition
Mirko Petruševski, Riste Škrekovski
Abstract
In this short paper, we introduce a new vertex coloring whose motivation comes from our series on odd edge-colorings of graphs. A proper vertex coloring φ of a graph G is said to be odd if for each non-isolated vertex x∈V(G) there exists a color c such that φ−1(c)∩N(x) is odd-sized. We prove that every simple planar graph admits an odd 9-coloring, and conjecture that 5 colors always suffice.
Topics & Concepts
CombinatoricsMathematicsVertex (graph theory)Edge coloringConjectureFractional coloringComplete coloringSimple graphGraphList coloringGraph coloringParity (physics)Discrete mathematicsGraph powerLine graphParticle physicsPhysicsAdvanced Graph Theory ResearchGraph Labeling and Dimension ProblemsLimits and Structures in Graph Theory