TY - JOUR
T1 - Polychromatic colorings of bounded degree plane graphs
AU - Horev, Elad
AU - Krakovski, Roi
PY - 2009/4
Y1 - 2009/4
N2 - A polychromatic k-coloring of a plane graph G is an assignment of k colors to the vertices of G such that every face of G has all k colors on its boundary. For a given plane graph G, one seeks the maximum number k such that G admits a polychromatic k-coloring. In this paper, it is proven that every connected plane graph of order at least three, and maximum degree three, other than K 4 or a subdivision of K4 on five vertices, admits a 3-coloring in the regular sense (i.e., no monochromatic edges) that is also a polychromatic 3-coloring. Our proof is constructive and implies a polynomial-time algorithm.
AB - A polychromatic k-coloring of a plane graph G is an assignment of k colors to the vertices of G such that every face of G has all k colors on its boundary. For a given plane graph G, one seeks the maximum number k such that G admits a polychromatic k-coloring. In this paper, it is proven that every connected plane graph of order at least three, and maximum degree three, other than K 4 or a subdivision of K4 on five vertices, admits a 3-coloring in the regular sense (i.e., no monochromatic edges) that is also a polychromatic 3-coloring. Our proof is constructive and implies a polynomial-time algorithm.
KW - Bounded degree graphs
KW - Plane graphs
KW - Vertex coloring with constraints on the faces
UR - http://www.scopus.com/inward/record.url?scp=65449166066&partnerID=8YFLogxK
U2 - 10.1002/jgt.20357
DO - 10.1002/jgt.20357
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AN - SCOPUS:65449166066
SN - 0364-9024
VL - 60
SP - 269
EP - 283
JO - Journal of Graph Theory
JF - Journal of Graph Theory
IS - 4
ER -