On a conjecture of Lovász on circle-representations of simple 4-regular planar graphs

Lovasz conjectured that every connected 4-regular planar graph G admits a realization as a system of circles, i.e., it can be drawn on the plane utilizing a set of circles, such that the vertices of G correspond to the intersection and touching points of the circles and the edges of G are the arc segments among pairs of intersection and touching points of the circles. In this paper, we settle this conjecture. In particular, (a) we first provide tight upper and lower bounds on the number of circles needed in a realization of any simple 4-regular planar graph, (b) we affirmatively answer Lovasz's conjecture, if G is 3-connected, and (c) we demonstrate an infinite class of simple connected 4-regular planar graphs which are not 3-connected (i.e., either simply connected or biconnected) and do not admit realizations as a system of circles.

[1]  Jan Kratochvíl,et al.  Representing graphs by disks and balls (a survey of recognition-complexity results) , 2001, Discret. Math..

[2]  Ioannis G. Tollis,et al.  Planar grid embedding in linear time , 1989 .

[3]  Paolo Manca Generating all planer graphs regular of degree four , 1979, J. Graph Theory.

[4]  Jenö Lehel,et al.  Generating all 4-regular planar graphs from the graph of the octahedron , 1981, J. Graph Theory.

[5]  Charles E. Leiserson,et al.  Area-Efficient Graph Layouts (for VLSI) , 1980, FOCS.

[6]  F. Göbel,et al.  Generating all 3-connected 4-regular planar graphs from the octahedron graph , 1993, J. Graph Theory.

[7]  David Eppstein,et al.  Drawing Trees with Perfect Angular Resolution and Polynomial Area , 2013, Discret. Comput. Geom..

[8]  Goos Kant,et al.  A Better Heuristic for Orthogonal Graph Drawings , 1994, ESA.

[9]  Béla Bollobás,et al.  Modern Graph Theory , 2002, Graduate Texts in Mathematics.

[10]  Roberto Tamassia,et al.  On Embedding a Graph in the Grid with the Minimum Number of Bends , 1987, SIAM J. Comput..

[11]  Bolyai János Matematikai Társulat,et al.  Combinatorial theory and its applications , 1970 .

[12]  Petr Hlinený Classes and Recognition of Curve Contact Graphs, , 1998, J. Comb. Theory, Ser. B.

[13]  D. West Introduction to Graph Theory , 1995 .

[14]  Frank Thomson Leighton,et al.  New lower bound techniques for VLSI , 1981, 22nd Annual Symposium on Foundations of Computer Science (sfcs 1981).

[15]  Leslie G. Valiant,et al.  Universality considerations in VLSI circuits , 1981, IEEE Transactions on Computers.

[16]  Michael T. Goodrich,et al.  Force-Directed Lombardi-Style Graph Drawing , 2011, Graph Drawing.