Graphs with Obstacle Number Greater than One

Authors

graphs , graph drawing , obstacle number

An obstacle representation of a graph

G

is a straight-line drawing of

G

in the plane, together with a collection of connected subsets of the plane, called obstacles, that block all non-edges of

G

while not blocking any edges of

G

. The obstacle number

obs (G)

is the least number of obstacles required to represent

G

. We study the structure of graphs with obstacle number greater than one. We show that the icosahedron has obstacle number

2

, thus answering a question of Alpert, Koch, & Laison asking whether all planar graphs have obstacle number at most

1

. We also show that the

1

-skeleta of two related polyhedra, the gyroelongated $4$ -bipyramid and the gyroelongated $6$ -bipyramid, have obstacle number

2

. The order of the former graph is

10

, which is also the order of the smallest known graph with obstacle number

2

, making this the smallest known planar graph with obstacle number

2

. Our methods involve instances of the Satisfiability problem; we make use of various "SAT solvers" in order to produce computer-assisted proofs.