Abstract
Colin de Vedière introduced an interesting linear algebraic invariant μ(G) of graphs. He proved that μ(G)≤2 if and only ifG is outerplanar, and μ(G)≤3 if and only ifG is planar. We prove that if the complement of a graphG onn nodes is outerplanar, then μ(G)≥n−4, and if it is planar, then μ(G)≥n−5. We give a full characterization of maximal planar graphs whose complementsG have μ(G)=n−5. In the opposite direction we show that ifG does not have “twin” nodes, then μ(G)≥n−3 implies that the complement ofG is outerplanar, and μ(G)≥n−4 implies that the complement ofG is planar.
Our main tools are a geometric formulation of the invariant, and constructing representations of graphs by spheres, related to the classical result of Koebe about representing planar graphs by touching disks. In particular we show that such sphere representations characterize outerplanar and planar graphs.
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References
E. Andre'ev: On convex polyhedra in Lobachevsky spaces,Mat. Sbornik, Nov. Ser.,81 (1970), 445–478.
R. Bacher andY. Colin de Verdière: Multiplicités des valeurs propres et transformations étoile-triangle des graphes,Bull. Soc. Math. France,123 (1995), 101–117.
Y. Colin de Verdière: Sur un nouvel invariant des graphes et un critère de planarité,J. Combin. Theory B,50 (1990) 11–21.
Y. Colin de Verdière: On a new graph invariant and a criterion for planarity, in:Graph Structure Theory (Robertson and P. D. Seymour, eds.), Contemporary Mathematics, Amer. Math. Soc. Providence, RI (1993), 137–147.
H. van der Holst: A short proof of the planarity characterization of Colin de Verdière,J. Combin. Theory B,65 (1995) 269–272.
H. van der Holst, L. Lovász andA. Schrijver: On the invariance of Colin de Verdière's graph parameter under clique sums,Linear Algebra and its Applications,226–228 (1995), 509–518.
P. Koebe: Kontaktprobleme der konformen Abbildung,Berichte über die Verhandlungen d. Sächs. Akad. d. Wiss., Math.-Phys. Klasse,88 (1936) 141–164.
A. V. Kostochka: Kombinatorial Analiz,8 (in Russian), Moscow (1989), 50–62.
P. Mani: Automorphismen von polyedrischen Graphen,Math. Annalen,192 (1971), 279–303.
J. Pach, P. K. Agarwal:Combinatorial Geometry, Willey, New York, 1995.
N. Robertson, P. Seymour andR. Thomas: Sachs' linkless embedding conjecture,J. Combin. Theory B 64 (1995), 185–227.
J. Reiterman, V. Rödl andE. Šinajová Embeddings of graphs in Euclidean spaces,Discr. Comput. Geom.,4, (1989), 349–364.
J. Reiterman, V. Rödl andE. Šinajová: Geometrical embeddings of graphs,Discrete Math.,74 (1989), 291–319.
H. Sachs: Coin graphs, polydedra, and conformal mapping,Discrete Math.,134 (1994), 133–138.
O. Schramm: How to cage an egg,Invent. Math.,107 (1992), 543–560.
M. Stiebitz: On Hadwiger's number—a problem of the Nordhaus-Gaddum type,Discrete Math,101 (1992), 307–317.
W. Thurston:Three-dimensional Geometry and Topology, MSRI, Berkeley, 1991.
W. Whiteley: Infinitesimally rigid polyhedra,Trans. Amer. Math. Soc.,285 (1984), 431–465.
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Kotlov, A., Lovász, L. & Vempala, S. The Colin de Verdière number and sphere representations of a graph. Combinatorica 17, 483–521 (1997). https://doi.org/10.1007/BF01195002
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DOI: https://doi.org/10.1007/BF01195002