Write abstract and introduction around the constructive 4-coloring motivation
Frame the paper's purpose: ask whether two constructive families of 4-colorable triangulations -- bridge-derived level graphs (parity 2-coloring) and intertwining trees (two trees, disjoint color pairs) -- suffice to generate every maximal planar graph on n vertices. An affirmative answer would be a constructive proof of the four color theorem for triangulations. State the duality bridge to Tait/Holton-McKay and the n=21 confirmation. Co-Authored-By: Claude Opus 4.7 <noreply@anthropic.com>
This commit is contained in:
@@ -17,40 +17,40 @@
|
||||
\providecommand\HyField@AuxAddToFields[1]{}
|
||||
\providecommand\HyField@AuxAddToCoFields[2]{}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{1}{Introduction}}{1}{section.1}\protected@file@percent }
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{2}{Definitions}}{1}{section.2}\protected@file@percent }
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {1}{\ignorespaces BFS levels from the degree-$3$ vertex source $S = \{4\}$. The source is level $0$, its three neighbours are level $1$, and the remaining vertices are level $2$. Colour encodes the level.}}{1}{figure.1}\protected@file@percent }
|
||||
\newlabel{fig:levels}{{1}{1}{BFS levels from the degree-$3$ vertex source $S = \{4\}$. The source is level $0$, its three neighbours are level $1$, and the remaining vertices are level $2$. Colour encodes the level}{figure.1}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {2}{\ignorespaces A level cycle in the triangulation of Figure\nonbreakingspace \ref {fig:levels}. The triangle $1\!-\!2\!-\!3$ is a simple cycle whose three vertices all lie at level $1$, so it is a level cycle at level $1$.}}{2}{figure.2}\protected@file@percent }
|
||||
\newlabel{fig:level-cycle}{{2}{2}{A level cycle in the triangulation of Figure~\ref {fig:levels}. The triangle $1\!-\!2\!-\!3$ is a simple cycle whose three vertices all lie at level $1$, so it is a level cycle at level $1$}{figure.2}{}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{2}{Definitions}}{2}{section.2}\protected@file@percent }
|
||||
\newlabel{def:edge-switch}{{2.4}{2}{Edge switch}{theorem.2.4}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {3}{\ignorespaces An edge switch on the level cycle of Figure\nonbreakingspace \ref {fig:level-cycle}. The chosen cycle edge $1\!-\!2$ is shared by the triangular faces $(0,1,2)$ and $(1,2,4)$; the switch deletes $1\!-\!2$ (red, left) and inserts $0\!-\!4$ (green, right). Vertex colours indicate the original levels in $G$.}}{2}{figure.3}\protected@file@percent }
|
||||
\newlabel{fig:edge-switch}{{3}{2}{An edge switch on the level cycle of Figure~\ref {fig:level-cycle}. The chosen cycle edge $1\!-\!2$ is shared by the triangular faces $(0,1,2)$ and $(1,2,4)$; the switch deletes $1\!-\!2$ (red, left) and inserts $0\!-\!4$ (green, right). Vertex colours indicate the original levels in $G$}{figure.3}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {4}{\ignorespaces Parity subgraphs of $G' = T$ with respect to the level structure of Figure\nonbreakingspace \ref {fig:levels} (here we take $G = G' = T$). Left: $T$ with vertices coloured by $\ell _G \nonscript \mskip -\medmuskip \mkern 5mu\mathbin {\mathgroup \symoperators mod}\penalty 900 \mkern 5mu\nonscript \mskip -\medmuskip 2$ (blue $=$ even, orange $=$ odd). Middle: the even parity subgraph $E_{G,S}(G')$, induced on $\{0, 4, 5, 6\}$; only edges with both endpoints even appear. Right: the odd parity subgraph $O_{G,S}(G')$, induced on $\{1, 2, 3\}$; the highlighted triangle shows that $O_{G,S}(G')$ is not bipartite for this choice of $G'$.}}{3}{figure.4}\protected@file@percent }
|
||||
\newlabel{fig:parity-subgraph}{{4}{3}{Parity subgraphs of $G' = T$ with respect to the level structure of Figure~\ref {fig:levels} (here we take $G = G' = T$). Left: $T$ with vertices coloured by $\ell _G \bmod 2$ (blue $=$ even, orange $=$ odd). Middle: the even parity subgraph $E_{G,S}(G')$, induced on $\{0, 4, 5, 6\}$; only edges with both endpoints even appear. Right: the odd parity subgraph $O_{G,S}(G')$, induced on $\{1, 2, 3\}$; the highlighted triangle shows that $O_{G,S}(G')$ is not bipartite for this choice of $G'$}{figure.4}{}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{3}{Outerplanarity of level components}}{3}{section.3}\protected@file@percent }
|
||||
\newlabel{sec:outerplanar-components}{{3}{3}{Outerplanarity of level components}{section.3}{}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{3}{Outerplanarity of level components}}{2}{section.3}\protected@file@percent }
|
||||
\newlabel{sec:outerplanar-components}{{3}{2}{Outerplanarity of level components}{section.3}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {1}{\ignorespaces BFS levels from the degree-$3$ vertex source $S = \{4\}$. The source is level $0$, its three neighbours are level $1$, and the remaining vertices are level $2$. Colour encodes the level.}}{3}{figure.1}\protected@file@percent }
|
||||
\newlabel{fig:levels}{{1}{3}{BFS levels from the degree-$3$ vertex source $S = \{4\}$. The source is level $0$, its three neighbours are level $1$, and the remaining vertices are level $2$. Colour encodes the level}{figure.1}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {2}{\ignorespaces A level cycle in the triangulation of Figure\nonbreakingspace \ref {fig:levels}. The triangle $1\!-\!2\!-\!3$ is a simple cycle whose three vertices all lie at level $1$, so it is a level cycle at level $1$.}}{3}{figure.2}\protected@file@percent }
|
||||
\newlabel{fig:level-cycle}{{2}{3}{A level cycle in the triangulation of Figure~\ref {fig:levels}. The triangle $1\!-\!2\!-\!3$ is a simple cycle whose three vertices all lie at level $1$, so it is a level cycle at level $1$}{figure.2}{}}
|
||||
\newlabel{thm:outerplanar-component}{{3.1}{3}{}{theorem.3.1}{}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{4}{Even Level Graphs}}{3}{section.4}\protected@file@percent }
|
||||
\newlabel{sec:even-level-graphs}{{4}{3}{Even Level Graphs}{section.4}{}}
|
||||
\newlabel{def:even-level-graph}{{4.1}{3}{Even Level Graph}{theorem.4.1}{}}
|
||||
\newlabel{thm:even-level-4colorable}{{4.2}{3}{}{theorem.4.2}{}}
|
||||
\newlabel{def:derived-level-graph}{{4.3}{4}{Derived level graph}{theorem.4.3}{}}
|
||||
\newlabel{def:bridge-switch}{{4.4}{4}{Bridge switch}{theorem.4.4}{}}
|
||||
\newlabel{def:bridge-derived-level-graph}{{4.5}{4}{Bridge-derived level graph}{theorem.4.5}{}}
|
||||
\newlabel{def:intertwining-tree}{{4.6}{4}{Intertwining tree}{theorem.4.6}{}}
|
||||
\newlabel{thm:intertwining-iff-hamiltonian-dual}{{4.7}{4}{}{theorem.4.7}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {3}{\ignorespaces An edge switch on the level cycle of Figure\nonbreakingspace \ref {fig:level-cycle}. The chosen cycle edge $1\!-\!2$ is shared by the triangular faces $(0,1,2)$ and $(1,2,4)$; the switch deletes $1\!-\!2$ (red, left) and inserts $0\!-\!4$ (green, right). Vertex colours indicate the original levels in $G$.}}{4}{figure.3}\protected@file@percent }
|
||||
\newlabel{fig:edge-switch}{{3}{4}{An edge switch on the level cycle of Figure~\ref {fig:level-cycle}. The chosen cycle edge $1\!-\!2$ is shared by the triangular faces $(0,1,2)$ and $(1,2,4)$; the switch deletes $1\!-\!2$ (red, left) and inserts $0\!-\!4$ (green, right). Vertex colours indicate the original levels in $G$}{figure.3}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {4}{\ignorespaces Parity subgraphs of $G' = T$ with respect to the level structure of Figure\nonbreakingspace \ref {fig:levels} (here we take $G = G' = T$). Left: $T$ with vertices coloured by $\ell _G \nonscript \mskip -\medmuskip \mkern 5mu\mathbin {\mathgroup \symoperators mod}\penalty 900 \mkern 5mu\nonscript \mskip -\medmuskip 2$ (blue $=$ even, orange $=$ odd). Middle: the even parity subgraph $E_{G,S}(G')$, induced on $\{0, 4, 5, 6\}$; only edges with both endpoints even appear. Right: the odd parity subgraph $O_{G,S}(G')$, induced on $\{1, 2, 3\}$; the highlighted triangle shows that $O_{G,S}(G')$ is not bipartite for this choice of $G'$.}}{4}{figure.4}\protected@file@percent }
|
||||
\newlabel{fig:parity-subgraph}{{4}{4}{Parity subgraphs of $G' = T$ with respect to the level structure of Figure~\ref {fig:levels} (here we take $G = G' = T$). Left: $T$ with vertices coloured by $\ell _G \bmod 2$ (blue $=$ even, orange $=$ odd). Middle: the even parity subgraph $E_{G,S}(G')$, induced on $\{0, 4, 5, 6\}$; only edges with both endpoints even appear. Right: the odd parity subgraph $O_{G,S}(G')$, induced on $\{1, 2, 3\}$; the highlighted triangle shows that $O_{G,S}(G')$ is not bipartite for this choice of $G'$}{figure.4}{}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{4}{Even Level Graphs}}{4}{section.4}\protected@file@percent }
|
||||
\newlabel{sec:even-level-graphs}{{4}{4}{Even Level Graphs}{section.4}{}}
|
||||
\newlabel{def:even-level-graph}{{4.1}{4}{Even Level Graph}{theorem.4.1}{}}
|
||||
\newlabel{thm:even-level-4colorable}{{4.2}{4}{}{theorem.4.2}{}}
|
||||
\newlabel{def:derived-level-graph}{{4.3}{5}{Derived level graph}{theorem.4.3}{}}
|
||||
\newlabel{def:bridge-switch}{{4.4}{5}{Bridge switch}{theorem.4.4}{}}
|
||||
\newlabel{def:bridge-derived-level-graph}{{4.5}{5}{Bridge-derived level graph}{theorem.4.5}{}}
|
||||
\newlabel{def:intertwining-tree}{{4.6}{5}{Intertwining tree}{theorem.4.6}{}}
|
||||
\newlabel{thm:intertwining-iff-hamiltonian-dual}{{4.7}{5}{}{theorem.4.7}{}}
|
||||
\citation{holton-mckay}
|
||||
\newlabel{conj:every-triangulation-derived}{{4.8}{6}{}{theorem.4.8}{}}
|
||||
\@writefile{toc}{\contentsline {subsection}{\tocsubsection {}{}{The boundary case $n = 21$}}{6}{section*.1}\protected@file@percent }
|
||||
\bibcite{holton-mckay}{1}
|
||||
\newlabel{conj:every-triangulation-derived}{{4.8}{5}{}{theorem.4.8}{}}
|
||||
\@writefile{toc}{\contentsline {subsection}{\tocsubsection {}{}{The boundary case $n = 21$}}{5}{section*.1}\protected@file@percent }
|
||||
\@writefile{lot}{\contentsline {table}{\numberline {1}{\ignorespaces The six Holton--McKay duals at $n = 21$, the first triangulations that are not intertwining trees. Each is a bridge-derived level graph: duals $1$ and $2$ are Even Level Graphs outright (zero switches), and the remaining four reach an Even Level Graph in $1$--$4$ bridge switches. All witnesses are step-verified.}}{7}{table.1}\protected@file@percent }
|
||||
\newlabel{tab:n21}{{1}{7}{The six Holton--McKay duals at $n = 21$, the first triangulations that are not intertwining trees. Each is a bridge-derived level graph: duals $1$ and $2$ are Even Level Graphs outright (zero switches), and the remaining four reach an Even Level Graph in $1$--$4$ bridge switches. All witnesses are step-verified}{table.1}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The six Holton--McKay duals, drawn as crossing-free planar graphs and coloured by parity (blue even, orange odd, with respect to the fixed level-parity labelling). The solid green edges are the bridge edges introduced by the bridge switches from each dual's witness Even Level Graph. Each green edge is a bridge of its parity subgraph, so no new cycle -- and in particular no odd cycle -- is created; duals $1$ and $2$ coincide with their Even Level Graphs and have no added edge.}}{7}{figure.5}\protected@file@percent }
|
||||
\newlabel{fig:n21-duals}{{5}{7}{The six Holton--McKay duals, drawn as crossing-free planar graphs and coloured by parity (blue even, orange odd, with respect to the fixed level-parity labelling). The solid green edges are the bridge edges introduced by the bridge switches from each dual's witness Even Level Graph. Each green edge is a bridge of its parity subgraph, so no new cycle -- and in particular no odd cycle -- is created; duals $1$ and $2$ coincide with their Even Level Graphs and have no added edge}{figure.5}{}}
|
||||
\newlabel{tocindent-1}{0pt}
|
||||
\newlabel{tocindent0}{14.69437pt}
|
||||
\newlabel{tocindent1}{17.77782pt}
|
||||
\newlabel{tocindent2}{0pt}
|
||||
\newlabel{tocindent3}{0pt}
|
||||
\@writefile{lot}{\contentsline {table}{\numberline {1}{\ignorespaces The six Holton--McKay duals at $n = 21$, the first triangulations that are not intertwining trees. Each is a bridge-derived level graph: duals $1$ and $2$ are Even Level Graphs outright (zero switches), and the remaining four reach an Even Level Graph in $1$--$4$ bridge switches. All witnesses are step-verified.}}{6}{table.1}\protected@file@percent }
|
||||
\newlabel{tab:n21}{{1}{6}{The six Holton--McKay duals at $n = 21$, the first triangulations that are not intertwining trees. Each is a bridge-derived level graph: duals $1$ and $2$ are Even Level Graphs outright (zero switches), and the remaining four reach an Even Level Graph in $1$--$4$ bridge switches. All witnesses are step-verified}{table.1}{}}
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The six Holton--McKay duals, drawn as crossing-free planar graphs and coloured by parity (blue even, orange odd, with respect to the fixed level-parity labelling). The solid green edges are the bridge edges introduced by the bridge switches from each dual's witness Even Level Graph. Each green edge is a bridge of its parity subgraph, so no new cycle -- and in particular no odd cycle -- is created; duals $1$ and $2$ coincide with their Even Level Graphs and have no added edge.}}{6}{figure.5}\protected@file@percent }
|
||||
\newlabel{fig:n21-duals}{{5}{6}{The six Holton--McKay duals, drawn as crossing-free planar graphs and coloured by parity (blue even, orange odd, with respect to the fixed level-parity labelling). The solid green edges are the bridge edges introduced by the bridge switches from each dual's witness Even Level Graph. Each green edge is a bridge of its parity subgraph, so no new cycle -- and in particular no odd cycle -- is created; duals $1$ and $2$ coincide with their Even Level Graphs and have no added edge}{figure.5}{}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{}{References}}{6}{section*.2}\protected@file@percent }
|
||||
\gdef \@abspage@last{6}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{}{References}}{8}{section*.2}\protected@file@percent }
|
||||
\gdef \@abspage@last{8}
|
||||
|
||||
@@ -1,4 +1,4 @@
|
||||
This is pdfTeX, Version 3.141592653-2.6-1.40.24 (TeX Live 2022) (preloaded format=pdflatex 2022.10.5) 22 MAY 2026 11:27
|
||||
This is pdfTeX, Version 3.141592653-2.6-1.40.24 (TeX Live 2022) (preloaded format=pdflatex 2022.10.5) 22 MAY 2026 11:33
|
||||
entering extended mode
|
||||
restricted \write18 enabled.
|
||||
%&-line parsing enabled.
|
||||
@@ -353,58 +353,63 @@ Package epstopdf-base Info: Redefining graphics rule for `.eps' on input line 4
|
||||
File: epstopdf-sys.cfg 2010/07/13 v1.3 Configuration of (r)epstopdf for TeX Liv
|
||||
e
|
||||
))
|
||||
<fig_levels.png, id=28, 454.21695pt x 391.34206pt>
|
||||
[1{/usr/local/texlive/2022/texmf-var/fonts/map/pdftex/updmap/pdftex.map}]
|
||||
<fig_levels.png, id=52, 454.21695pt x 391.34206pt>
|
||||
File: fig_levels.png Graphic file (type png)
|
||||
<use fig_levels.png>
|
||||
Package pdftex.def Info: fig_levels.png used on input line 108.
|
||||
Package pdftex.def Info: fig_levels.png used on input line 184.
|
||||
(pdftex.def) Requested size: 198.0011pt x 170.59666pt.
|
||||
<fig_level_cycle.png, id=30, 452.04884pt x 391.34206pt>
|
||||
|
||||
|
||||
LaTeX Warning: `h' float specifier changed to `ht'.
|
||||
|
||||
<fig_level_cycle.png, id=54, 452.04884pt x 391.34206pt>
|
||||
File: fig_level_cycle.png Graphic file (type png)
|
||||
<use fig_level_cycle.png>
|
||||
Package pdftex.def Info: fig_level_cycle.png used on input line 122.
|
||||
Package pdftex.def Info: fig_level_cycle.png used on input line 198.
|
||||
(pdftex.def) Requested size: 198.0011pt x 171.40878pt.
|
||||
|
||||
|
||||
LaTeX Warning: `h' float specifier changed to `ht'.
|
||||
|
||||
[1{/usr/local/texlive/2022/texmf-var/fonts/map/pdftex/updmap/pdftex.map} <./fig
|
||||
_levels.png>]
|
||||
<fig_edge_switch.png, id=52, 859.65166pt x 378.33345pt>
|
||||
<fig_edge_switch.png, id=56, 859.65166pt x 378.33345pt>
|
||||
File: fig_edge_switch.png Graphic file (type png)
|
||||
<use fig_edge_switch.png>
|
||||
Package pdftex.def Info: fig_edge_switch.png used on input line 141.
|
||||
Package pdftex.def Info: fig_edge_switch.png used on input line 217.
|
||||
(pdftex.def) Requested size: 341.9989pt x 150.51671pt.
|
||||
<fig_parity_subgraph.png, id=54, 1076.46165pt x 319.79475pt>
|
||||
File: fig_parity_subgraph.png Graphic file (type png)
|
||||
<use fig_parity_subgraph.png>
|
||||
Package pdftex.def Info: fig_parity_subgraph.png used on input line 159.
|
||||
(pdftex.def) Requested size: 360.0pt x 106.9477pt.
|
||||
|
||||
|
||||
LaTeX Warning: `h' float specifier changed to `ht'.
|
||||
|
||||
[2 <./fig_level_cycle.png> <./fig_edge_switch.png>] [3 <./fig_parity_subgraph.p
|
||||
ng>] [4]
|
||||
<fig_parity_subgraph.png, id=58, 1076.46165pt x 319.79475pt>
|
||||
File: fig_parity_subgraph.png Graphic file (type png)
|
||||
<use fig_parity_subgraph.png>
|
||||
Package pdftex.def Info: fig_parity_subgraph.png used on input line 235.
|
||||
(pdftex.def) Requested size: 360.0pt x 106.9477pt.
|
||||
|
||||
LaTeX Warning: `h' float specifier changed to `ht'.
|
||||
|
||||
[2] [3 <./fig_levels.png> <./fig_level_cycle.png>] [4 <./fig_edge_switch.png> <
|
||||
./fig_parity_subgraph.png>] [5]
|
||||
|
||||
Package hyperref Warning: Token not allowed in a PDF string (Unicode):
|
||||
(hyperref) removing `math shift' on input line 339.
|
||||
(hyperref) removing `math shift' on input line 415.
|
||||
|
||||
|
||||
Package hyperref Warning: Token not allowed in a PDF string (Unicode):
|
||||
(hyperref) removing `math shift' on input line 339.
|
||||
(hyperref) removing `math shift' on input line 415.
|
||||
|
||||
<figures/n21_duals.png, id=96, 1373.13pt x 867.24pt>
|
||||
[6]
|
||||
<figures/n21_duals.png, id=114, 1373.13pt x 867.24pt>
|
||||
File: figures/n21_duals.png Graphic file (type png)
|
||||
<use figures/n21_duals.png>
|
||||
Package pdftex.def Info: figures/n21_duals.png used on input line 399.
|
||||
Package pdftex.def Info: figures/n21_duals.png used on input line 475.
|
||||
(pdftex.def) Requested size: 360.0pt x 227.35617pt.
|
||||
[5] [6 <./figures/n21_duals.png>] (./paper.aux)
|
||||
[7 <./figures/n21_duals.png>] [8] (./paper.aux)
|
||||
Package rerunfilecheck Info: File `paper.out' has not changed.
|
||||
(rerunfilecheck) Checksum: 06539E3751DA0B503943CA6640B71438;911.
|
||||
)
|
||||
Here is how much of TeX's memory you used:
|
||||
9752 strings out of 478268
|
||||
151020 string characters out of 5846347
|
||||
9754 strings out of 478268
|
||||
151032 string characters out of 5846347
|
||||
454766 words of memory out of 5000000
|
||||
27654 multiletter control sequences out of 15000+600000
|
||||
475666 words of font info for 53 fonts, out of 8000000 for 9000
|
||||
@@ -415,18 +420,19 @@ Here is how much of TeX's memory you used:
|
||||
></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmex10.pfb>
|
||||
</usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmmi10.pfb><
|
||||
/usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmmi7.pfb></u
|
||||
sr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr10.pfb></usr
|
||||
/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr7.pfb></usr/lo
|
||||
cal/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr8.pfb></usr/local
|
||||
/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy10.pfb></usr/local/
|
||||
texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy7.pfb></usr/local/te
|
||||
xlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti10.pfb></usr/local/tex
|
||||
live/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti8.pfb></usr/local/texli
|
||||
ve/2022/texmf-dist/fonts/type1/public/amsfonts/symbols/msam10.pfb>
|
||||
Output written on paper.pdf (6 pages, 1076840 bytes).
|
||||
sr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmmi8.pfb></usr
|
||||
/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr10.pfb></usr/l
|
||||
ocal/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr7.pfb></usr/loca
|
||||
l/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr8.pfb></usr/local/t
|
||||
exlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy10.pfb></usr/local/te
|
||||
xlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy7.pfb></usr/local/texl
|
||||
ive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti10.pfb></usr/local/texli
|
||||
ve/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti8.pfb></usr/local/texlive
|
||||
/2022/texmf-dist/fonts/type1/public/amsfonts/symbols/msam10.pfb>
|
||||
Output written on paper.pdf (8 pages, 1093752 bytes).
|
||||
PDF statistics:
|
||||
174 PDF objects out of 1000 (max. 8388607)
|
||||
128 compressed objects within 2 object streams
|
||||
34 named destinations out of 1000 (max. 500000)
|
||||
196 PDF objects out of 1000 (max. 8388607)
|
||||
146 compressed objects within 2 object streams
|
||||
36 named destinations out of 1000 (max. 500000)
|
||||
74 words of extra memory for PDF output out of 10000 (max. 10000000)
|
||||
|
||||
|
||||
Binary file not shown.
@@ -80,12 +80,88 @@
|
||||
\dedicatory{}
|
||||
|
||||
\begin{abstract}
|
||||
We investigate whether two constructive families of $4$-colorable
|
||||
triangulations are, for each $n$, already rich enough to produce every
|
||||
maximal planar graph on $n$ vertices. The first family is the
|
||||
\emph{bridge-derived level graphs}: starting from an \emph{Even Level
|
||||
Graph} -- a triangulation all of whose level cycles, measured by
|
||||
breadth-first distance from a chosen source vertex, are even -- we apply
|
||||
\emph{bridge switches}, edge switches that never close a cycle in either
|
||||
parity subgraph. Every such graph is $4$-colorable, inheriting the parity
|
||||
$2$-coloring of an Even Level Graph. The second family is the
|
||||
\emph{intertwining trees}: triangulations whose vertices split into two
|
||||
sets each inducing a tree, which are $4$-colorable by coloring the two
|
||||
trees from disjoint pairs of colors. We conjecture that every maximal
|
||||
planar graph is a bridge-derived level graph, an intertwining tree, or
|
||||
both; since both families are $4$-colorable by construction, the
|
||||
conjecture would give a constructive proof of the four color theorem for
|
||||
triangulations, and hence for all planar graphs. We show that a
|
||||
triangulation is an intertwining tree exactly when its dual is
|
||||
Hamiltonian, so every triangulation on at most $20$ vertices is an
|
||||
intertwining tree and the first possible failures occur at $n = 21$, at
|
||||
the six duals of the Holton--McKay graphs. We verify that all six are
|
||||
bridge-derived level graphs, confirming the conjecture in its first
|
||||
nontrivial case.
|
||||
\end{abstract}
|
||||
|
||||
\maketitle
|
||||
|
||||
\section{Introduction}
|
||||
|
||||
The four color theorem states that every planar graph is properly
|
||||
$4$-colorable. It suffices to prove this for \emph{maximal} planar graphs
|
||||
(triangulations), since every planar graph is a spanning subgraph of one.
|
||||
The known proofs proceed by reducing a hypothetical minimal counterexample,
|
||||
either through computer-checked unavoidable configurations or through
|
||||
discharging.
|
||||
|
||||
We take a constructive view. Instead of coloring an arbitrary
|
||||
triangulation, we ask which triangulations can be \emph{assembled} by
|
||||
operations that manifestly preserve $4$-colorability, and whether those
|
||||
operations reach all of them. We study two such constructions, and our
|
||||
motivating question is whether the two together are sufficient: does every
|
||||
maximal planar graph on $n$ vertices arise from one of them?
|
||||
|
||||
The first construction builds on the \emph{level} structure of a
|
||||
triangulation. Fixing a source vertex and taking breadth-first levels, an
|
||||
\emph{Even Level Graph} (Definition~\ref{def:even-level-graph}) is a
|
||||
triangulation whose level cycles are all even; equivalently both of its
|
||||
parity subgraphs are bipartite, and a $2$-coloring of each parity subgraph
|
||||
-- two colors for the even-level vertices, two for the odd -- is a proper
|
||||
$4$-coloring (Theorem~\ref{thm:even-level-4colorable}). From an Even Level
|
||||
Graph we generate further triangulations by edge switches; restricting to
|
||||
\emph{bridge switches} (Definition~\ref{def:bridge-switch}), which add an
|
||||
edge to a parity subgraph only when it is a bridge there, guarantees that
|
||||
no new cycle -- and in particular no odd cycle -- ever appears in a parity
|
||||
subgraph. The resulting \emph{bridge-derived level graphs}
|
||||
(Definition~\ref{def:bridge-derived-level-graph}) therefore remain
|
||||
$4$-colorable by the same parity coloring.
|
||||
|
||||
The second construction is purely combinatorial: an \emph{intertwining
|
||||
tree} (Definition~\ref{def:intertwining-tree}) is a triangulation whose
|
||||
vertex set partitions into two parts each inducing a tree. Coloring one
|
||||
tree from $\{1,2\}$ and the other from $\{3,4\}$ is a proper $4$-coloring,
|
||||
since edges inside a part join differently-colored tree vertices and edges
|
||||
across the parts join the disjoint color sets.
|
||||
|
||||
Our central question is whether these two families exhaust all
|
||||
triangulations
|
||||
(Conjecture~\ref{conj:every-triangulation-derived}). As both families
|
||||
consist of $4$-colorable graphs, an affirmative answer would constitute a
|
||||
constructive proof of the four color theorem for triangulations.
|
||||
|
||||
We connect the two constructions through duality: a triangulation is an
|
||||
intertwining tree if and only if its dual is Hamiltonian
|
||||
(Theorem~\ref{thm:intertwining-iff-hamiltonian-dual}). Tait's conjecture --
|
||||
that every $3$-connected cubic planar graph is Hamiltonian -- fails first
|
||||
at $38$ vertices, where Holton and McKay found exactly six counterexamples;
|
||||
dually, every triangulation on at most $20$ vertices is an intertwining
|
||||
tree, and the first triangulations that are not are the six $21$-vertex
|
||||
duals of the Holton--McKay graphs. These six are therefore the first
|
||||
nontrivial test of the conjecture, and we verify that all six are
|
||||
bridge-derived level graphs -- each at most four bridge switches from an
|
||||
Even Level Graph, and two of them Even Level Graphs already.
|
||||
|
||||
\section{Definitions}
|
||||
|
||||
Throughout, $G = (V, E)$ is a plane maximal planar graph (a triangulation)
|
||||
|
||||
Reference in New Issue
Block a user