论文信息 - Bounds on the chromatic number of intersection graphs of sets in the plane

Bounds on the chromatic number of intersection graphs of sets in the plane

In this paper we show that the chromatic number of intersection graphs of congruent geometric figures obtained by translations of a fixed figure in the plane is bounded by the clique number. Further, in the paper we prove that the triangle-free intersection graph of a finite number of compact connected sets with piecewise differentiable Jordan curve boundaries is planar and hence, is 3-colorable.

Irina G. Perepelitsa

[1] B. Grünbaum. Measures of symmetry for convex sets , 1963 .

[2] Alexandr V. Kostochka,et al. Colouring triangle-free intersection graphs of boxes on the plane , 2000, Discret. Math..

[3] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.

[4] Alexandr V. Kostochka,et al. Colouring Relatives of Intervals on the Plane, II , 1998 .

[5] Frank Harary,et al. Graph Theory , 2016 .

[6] Alexandr V. Kostochka,et al. Coloring Relatives of Intervals on the Plane, I: Chromatic Number Versus Girth , 1998, Eur. J. Comb..

[7] Branko Grünbaum,et al. On a Coloring Problem. , 1960 .