266 research outputs found
Grid Representations and the Chromatic Number
A grid drawing of a graph maps vertices to grid points and edges to line
segments that avoid grid points representing other vertices. We show that there
is a number of grid points that some line segment of an arbitrary grid drawing
must intersect. This number is closely connected to the chromatic number.
Second, we study how many columns we need to draw a graph in the grid,
introducing some new \NP-complete problems. Finally, we show that any planar
graph has a planar grid drawing where every line segment contains exactly two
grid points. This result proves conjectures asked by David Flores-Pe\~naloza
and Francisco Javier Zaragoza Martinez.Comment: 22 pages, 8 figure
To Prove Four Color Theorem
In this paper, we give a proof for four color theorem(four color conjecture).
Our proof does not involve computer assistance and the most important is that
it can be generalized to prove Hadwiger Conjecture. Moreover, we give
algorithms to color and test planarity of planar graphs, which can be
generalized to graphs containing minor.
There are four parts of this paper:
Part-1: To Prove Four Color Theorem
Part-2: An Equivalent Statement of Hadwiger Conjecture when
Part-3: A New Proof of Wagner's Equivalence Theorem
Part-4: A Geometric View of Outerplanar GraphComment: The paper is further reduced, and each part is more self-contained,
is the fina
Embedded graph 3-coloring and flows
A graph drawn in a surface is a near-quadrangulation if the sum of the
lengths of the faces different from 4-faces is bounded by a fixed constant. We
leverage duality between colorings and flows to design an efficient algorithm
for 3-precoloring-extension in near-quadrangulations of orientable surfaces.
Furthermore, we use this duality to strengthen previously known sufficient
conditions for 3-colorability of triangle-free graphs drawn in orientable
surfaces.Comment: 53 pages, 15 figure
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