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25th Australasian Conference on Combinatorial Mathematics and Combinatorial Computing
December 4-8, 2000
University of Canterbury
Christchurch, New Zealand

Organizers
Charles Semple, Mike Steel

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Bilinski maps and construction of geodesics
by
Mark E. Watkins
Syracuse University, Syracuse NY, USA
Coauthors: Jennifer Bruce (Maryville College, Maryville TN, USA)

Very subtle changes in the structure of a locally finite, 1-ended, planar map mean the difference between exponential and merely quadratic growth.

Let Ga, b denote the class of 1-ended, connected planar maps wherein the valence of each vertex is finite but at least a while the covalence of each face is finite but at least b. We consider also the subclasses Ga+, b (resp., Ga, b+) wherein no edge is incident with two a-valent vertices (resp., two b-covalent faces).

The classes G4, 4, G6, 3, and G3, 6 span this chasm, while maps in G5, 3+ and its dual class have exponential growth. We study the members of these classes from the following two points of view:

1. Are they representable as Bilinski maps all of whose edges either lie on concentric circuits about an arbitrary vertex or join vertices on consecutive circuits?

2. Is there a simple algorithm, starting from an arbitrary edge, for constructing a geodetic path of arbitrary length, a geodetic ray, or even a geodetic double ray?

Date received: October 24, 2000

Copyright © 2000 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cafn-18.