Regular and biregular planar cages

Abstract

We study the Cage Problem for regular and biregular planar graphs. A (k,g)-graph is a k-regular graph with girth g. A (k,g)-cage is a (k,g)-graph of minimum order. It is not difficult to conclude that the regular planar cages are the Platonic Solids. A (\r,m\;g)-graph is a graph of girth g whose vertices have degrees r and m. A (\r,m\;g)-cage is a (\r,m\;g)-graph of minimum order. In this case we determine the triplets of values (\r,m\;g) for which there exist planar (\r,m\;g)--graphs, for all those values we construct examples. Furthermore, for many triplets (\r,m\;g) we build the (\r,m\;g)-cages.