dual_decomposition: move strengthened conjecture into Section 4 + 4CT implication
- Cut Conjecture 3.8 + Remark 3.9 from Section 3 and move into a new
Section 4 "The Four Colour Theorem from a strengthened conjecture".
- Add Remark 4.X spelling out the implication: clause (4)(i) forces the
cyclic colour pattern (c,a,c,b) on the new 4-face f_n, two opposite
edges of which satisfy the hypothesis of Theorem 3.9 verbatim; case
(ii) is conjecturally reducible to case (i) via a Kempe swap on the
{b,c}-cycle through X_1 X_2. Theorem 3.9 then produces the proper
3-edge-colouring of the contraction, contradicting minimality of G.
- Rewrite the bridge prose into the cubic-contraction definition to
reference Section 4 forward, rather than the conjecture directly.
Co-Authored-By: Claude Opus 4.7 <noreply@anthropic.com>
This commit is contained in:
@@ -23,17 +23,20 @@
|
|||||||
\newlabel{lem:all-distinct-exists}{{3.5}{9}}
|
\newlabel{lem:all-distinct-exists}{{3.5}{9}}
|
||||||
\newlabel{conj:face-monochromatic-pair-on-merged-kempe-cycle}{{3.6}{9}}
|
\newlabel{conj:face-monochromatic-pair-on-merged-kempe-cycle}{{3.6}{9}}
|
||||||
\newlabel{rem:conj-3-6-empirical}{{3.7}{10}}
|
\newlabel{rem:conj-3-6-empirical}{{3.7}{10}}
|
||||||
\newlabel{conj:face-monochromatic-pair-strengthened}{{3.8}{10}}
|
\newlabel{def:cubic-edge-contraction}{{3.8}{10}}
|
||||||
\newlabel{rem:conj-3-8-empirical}{{3.9}{11}}
|
\@writefile{lof}{\contentsline {figure}{\numberline {4}{\ignorespaces Cubic-graph edge contraction (Definition\nonbreakingspace 3.8\hbox {}). Left: a fragment of a cubic plane graph with the contracted edge $e = uv$ highlighted in red. Middle: deleting $e$ leaves $u$ and $v$ of degree\nonbreakingspace $2$. Right: smoothing $u$ and $v$ replaces each pair of incident edges by a single new edge, removing $u, v$ and giving a cubic plane graph again.}}{11}{}\protected@file@percent }
|
||||||
\newlabel{def:cubic-edge-contraction}{{3.10}{11}}
|
\newlabel{fig:cubic-edge-contraction}{{4}{11}}
|
||||||
\newlabel{thm:cubic-contraction-4face}{{3.11}{11}}
|
\newlabel{thm:cubic-contraction-4face}{{3.9}{11}}
|
||||||
|
\@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The recolouring used in the proof of Theorem\nonbreakingspace 3.9\hbox {}. Left: the $4$-face $f$ of $H$ under $\varphi $, with the forced colours $\varphi (e_0) = a$, $\varphi (e_1) = b$, $\varphi (e_2) = \varphi (e_3) = c$, $\varphi (w_0) = \varphi (w_1) = b$, and $\varphi (w_2) = \varphi (w_3) = a$. Right: the contracted graph $H'$ under $\varphi '$. The smoothed-in edges $e_2', e_3'$ inherit the colour $b$ from $w_0, w_1$, and $e_1$ is recoloured from $b$ to $c$; every edge outside the face neighbourhood keeps its $\varphi $-colour (dotted in red: the five edges of $H$ removed by the contraction).}}{12}{}\protected@file@percent }
|
||||||
|
\newlabel{fig:thm-cubic-contraction-4face}{{5}{12}}
|
||||||
|
\@writefile{toc}{\contentsline {section}{\tocsection {}{4}{The Four Colour Theorem from a strengthened conjecture}}{12}{}\protected@file@percent }
|
||||||
|
\newlabel{sec:toward-4ct}{{4}{12}}
|
||||||
|
\newlabel{conj:face-monochromatic-pair-strengthened}{{4.1}{12}}
|
||||||
\newlabel{tocindent-1}{0pt}
|
\newlabel{tocindent-1}{0pt}
|
||||||
\newlabel{tocindent0}{0pt}
|
\newlabel{tocindent0}{0pt}
|
||||||
\newlabel{tocindent1}{17.77782pt}
|
\newlabel{tocindent1}{17.77782pt}
|
||||||
\newlabel{tocindent2}{0pt}
|
\newlabel{tocindent2}{0pt}
|
||||||
\newlabel{tocindent3}{0pt}
|
\newlabel{tocindent3}{0pt}
|
||||||
\@writefile{lof}{\contentsline {figure}{\numberline {4}{\ignorespaces Cubic-graph edge contraction (Definition\nonbreakingspace 3.10\hbox {}). Left: a fragment of a cubic plane graph with the contracted edge $e = uv$ highlighted in red. Middle: deleting $e$ leaves $u$ and $v$ of degree\nonbreakingspace $2$. Right: smoothing $u$ and $v$ replaces each pair of incident edges by a single new edge, removing $u, v$ and giving a cubic plane graph again.}}{12}{}\protected@file@percent }
|
\newlabel{rem:conj-3-8-empirical}{{4.2}{13}}
|
||||||
\newlabel{fig:cubic-edge-contraction}{{4}{12}}
|
\newlabel{rem:implication-4ct}{{4.3}{13}}
|
||||||
\@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The recolouring used in the proof of Theorem\nonbreakingspace 3.11\hbox {}. Left: the $4$-face $f$ of $H$ under $\varphi $, with the forced colours $\varphi (e_0) = a$, $\varphi (e_1) = b$, $\varphi (e_2) = \varphi (e_3) = c$, $\varphi (w_0) = \varphi (w_1) = b$, and $\varphi (w_2) = \varphi (w_3) = a$. Right: the contracted graph $H'$ under $\varphi '$. The smoothed-in edges $e_2', e_3'$ inherit the colour $b$ from $w_0, w_1$, and $e_1$ is recoloured from $b$ to $c$; every edge outside the face neighbourhood keeps its $\varphi $-colour (dotted in red: the five edges of $H$ removed by the contraction).}}{13}{}\protected@file@percent }
|
\gdef \@abspage@last{14}
|
||||||
\newlabel{fig:thm-cubic-contraction-4face}{{5}{13}}
|
|
||||||
\gdef \@abspage@last{13}
|
|
||||||
|
|||||||
@@ -1,4 +1,4 @@
|
|||||||
This is pdfTeX, Version 3.141592653-2.6-1.40.24 (TeX Live 2022) (preloaded format=pdflatex 2022.10.5) 24 MAY 2026 13:27
|
This is pdfTeX, Version 3.141592653-2.6-1.40.24 (TeX Live 2022) (preloaded format=pdflatex 2022.10.5) 24 MAY 2026 13:42
|
||||||
entering extended mode
|
entering extended mode
|
||||||
restricted \write18 enabled.
|
restricted \write18 enabled.
|
||||||
%&-line parsing enabled.
|
%&-line parsing enabled.
|
||||||
@@ -299,71 +299,64 @@ Underfull \hbox (badness 6094) in paragraph at lines 498--498
|
|||||||
|
|
||||||
[7] [8 <./fig_alg_step0.png> <./fig_alg_step1.png> <./fig_alg_step2.png>]
|
[7] [8 <./fig_alg_step0.png> <./fig_alg_step1.png> <./fig_alg_step2.png>]
|
||||||
[9] [10]
|
[9] [10]
|
||||||
Underfull \hbox (badness 1648) in paragraph at lines 705--710
|
<fig_cubic_edge_contraction.png, id=75, 950.752pt x 203.159pt>
|
||||||
\OT1/cmr/m/it/10 Remark \OT1/cmr/m/n/10 3.9\OT1/cmr/m/it/10 . \OT1/cmr/m/n/10 T
|
File: fig_cubic_edge_contraction.png Graphic file (type png)
|
||||||
|
<use fig_cubic_edge_contraction.png>
|
||||||
|
Package pdftex.def Info: fig_cubic_edge_contraction.png used on input line 702
|
||||||
|
.
|
||||||
|
(pdftex.def) Requested size: 341.9989pt x 73.08138pt.
|
||||||
|
[11 <./fig_cubic_edge_contraction.png>]
|
||||||
|
<fig_thm_cubic_contraction_4face.png, id=80, 916.223pt x 417.56pt>
|
||||||
|
File: fig_thm_cubic_contraction_4face.png Graphic file (type png)
|
||||||
|
<use fig_thm_cubic_contraction_4face.png>
|
||||||
|
Package pdftex.def Info: fig_thm_cubic_contraction_4face.png used on input lin
|
||||||
|
e 777.
|
||||||
|
(pdftex.def) Requested size: 352.79846pt x 160.78339pt.
|
||||||
|
[12 <./fig_thm_cubic_contraction_4face.png>]
|
||||||
|
Underfull \hbox (badness 1648) in paragraph at lines 837--842
|
||||||
|
\OT1/cmr/m/it/10 Remark \OT1/cmr/m/n/10 4.2\OT1/cmr/m/it/10 . \OT1/cmr/m/n/10 T
|
||||||
he strength-ened con-jec-ture was tested on the same chord-
|
he strength-ened con-jec-ture was tested on the same chord-
|
||||||
[]
|
[]
|
||||||
|
|
||||||
|
|
||||||
Underfull \hbox (badness 1014) in paragraph at lines 705--710
|
Underfull \hbox (badness 1014) in paragraph at lines 837--842
|
||||||
\OT1/cmr/m/n/10 apex+Kempe colour-ings as Re-mark 3.7[]; for each colour-ing we
|
\OT1/cmr/m/n/10 apex+Kempe colour-ings as Re-mark 3.7[]; for each colour-ing we
|
||||||
sought any
|
sought any
|
||||||
[]
|
[]
|
||||||
|
|
||||||
<fig_cubic_edge_contraction.png, id=75, 950.752pt x 203.159pt>
|
[13] [14] (./paper.aux) )
|
||||||
File: fig_cubic_edge_contraction.png Graphic file (type png)
|
|
||||||
<use fig_cubic_edge_contraction.png>
|
|
||||||
Package pdftex.def Info: fig_cubic_edge_contraction.png used on input line 769
|
|
||||||
.
|
|
||||||
(pdftex.def) Requested size: 341.9989pt x 73.08138pt.
|
|
||||||
|
|
||||||
LaTeX Warning: `h' float specifier changed to `ht'.
|
|
||||||
|
|
||||||
[11]
|
|
||||||
<fig_thm_cubic_contraction_4face.png, id=79, 916.223pt x 417.56pt>
|
|
||||||
File: fig_thm_cubic_contraction_4face.png Graphic file (type png)
|
|
||||||
<use fig_thm_cubic_contraction_4face.png>
|
|
||||||
Package pdftex.def Info: fig_thm_cubic_contraction_4face.png used on input lin
|
|
||||||
e 844.
|
|
||||||
(pdftex.def) Requested size: 352.79846pt x 160.78339pt.
|
|
||||||
|
|
||||||
|
|
||||||
LaTeX Warning: `h' float specifier changed to `ht'.
|
|
||||||
|
|
||||||
[12 <./fig_cubic_edge_contraction.png>] [13 <./fig_thm_cubic_contraction_4face.
|
|
||||||
png>] (./paper.aux) )
|
|
||||||
Here is how much of TeX's memory you used:
|
Here is how much of TeX's memory you used:
|
||||||
3112 strings out of 478268
|
3114 strings out of 478268
|
||||||
44739 string characters out of 5846347
|
44776 string characters out of 5846347
|
||||||
347356 words of memory out of 5000000
|
346374 words of memory out of 5000000
|
||||||
21143 multiletter control sequences out of 15000+600000
|
21145 multiletter control sequences out of 15000+600000
|
||||||
478077 words of font info for 62 fonts, out of 8000000 for 9000
|
478077 words of font info for 62 fonts, out of 8000000 for 9000
|
||||||
1302 hyphenation exceptions out of 8191
|
1302 hyphenation exceptions out of 8191
|
||||||
69i,9n,76p,1306b,398s stack positions out of 10000i,1000n,20000p,200000b,200000s
|
69i,9n,76p,1306b,326s stack positions out of 10000i,1000n,20000p,200000b,200000s
|
||||||
</usr/local/texlive/2022/texmf-dist/fonts/type1/public/ams
|
</usr/local/texlive/2022/texmf-dist/fonts/type1/public
|
||||||
fonts/cm/cmbx10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsf
|
/amsfonts/cm/cmbx10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/
|
||||||
onts/cm/cmcsc10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsf
|
amsfonts/cm/cmcsc10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/
|
||||||
onts/cm/cmex10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfo
|
amsfonts/cm/cmex10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/a
|
||||||
nts/cm/cmmi10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfon
|
msfonts/cm/cmmi10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/am
|
||||||
ts/cm/cmmi5.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts
|
sfonts/cm/cmmi5.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsf
|
||||||
/cm/cmmi7.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/c
|
onts/cm/cmmi7.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfon
|
||||||
m/cmmi9.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/
|
ts/cm/cmmi9.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts
|
||||||
cmr10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cm
|
/cm/cmr10.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/c
|
||||||
r5.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr7.
|
m/cmr5.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/c
|
||||||
pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr8.pfb
|
mr7.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr8
|
||||||
></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr9.pfb></
|
.pfb></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmr9.pf
|
||||||
usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy10.pfb></u
|
b></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy10.pfb
|
||||||
sr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy5.pfb></usr
|
></usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy5.pfb><
|
||||||
/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy7.pfb></usr/l
|
/usr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy7.pfb></u
|
||||||
ocal/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy9.pfb></usr/loc
|
sr/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy9.pfb></usr
|
||||||
al/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti10.pfb></usr/loca
|
/local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti10.pfb></usr/
|
||||||
l/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti8.pfb></usr/local/
|
local/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti8.pfb></usr/lo
|
||||||
texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmtt10.pfb></usr/local/t
|
cal/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmtt10.pfb></usr/loc
|
||||||
exlive/2022/texmf-dist/fonts/type1/public/amsfonts/symbols/msam10.pfb>
|
al/texlive/2022/texmf-dist/fonts/type1/public/amsfonts/symbols/msam10.pfb>
|
||||||
Output written on paper.pdf (13 pages, 1144897 bytes).
|
Output written on paper.pdf (14 pages, 1148116 bytes).
|
||||||
PDF statistics:
|
PDF statistics:
|
||||||
172 PDF objects out of 1000 (max. 8388607)
|
175 PDF objects out of 1000 (max. 8388607)
|
||||||
92 compressed objects within 1 object stream
|
94 compressed objects within 1 object stream
|
||||||
0 named destinations out of 1000 (max. 500000)
|
0 named destinations out of 1000 (max. 500000)
|
||||||
61 words of extra memory for PDF output out of 10000 (max. 10000000)
|
61 words of extra memory for PDF output out of 10000 (max. 10000000)
|
||||||
|
|
||||||
|
|||||||
Binary file not shown.
@@ -665,78 +665,11 @@ every $(G, F, i, \varphi)$ with content, all three clauses of the
|
|||||||
conjecture hold simultaneously.
|
conjecture hold simultaneously.
|
||||||
\end{remark}
|
\end{remark}
|
||||||
|
|
||||||
\begin{conjecture}[Strengthening of Conjecture~\ref{conj:face-monochromatic-pair-on-merged-kempe-cycle}]
|
|
||||||
\label{conj:face-monochromatic-pair-strengthened}
|
|
||||||
Let $G$, $\widehat{G}'_{v,i}$, $\varphi$ be as in
|
|
||||||
Conjecture~\ref{conj:face-monochromatic-pair-on-merged-kempe-cycle}. Then
|
|
||||||
there exist $F$, $e_1$, $e_2$ satisfying clauses (1)--(3) of that
|
|
||||||
conjecture, and the following additional clause holds.
|
|
||||||
|
|
||||||
Let $X_1, X_2$ be the new vertices subdividing $e_1, e_2$, joined by a new
|
|
||||||
edge $X_1 X_2$ inside $F$; write $\widehat{G}'^{+}$ for the resulting
|
|
||||||
modified graph (which has $|V(\widehat{G}'_{v,i})|+2$ vertices and
|
|
||||||
$|E(\widehat{G}'_{v,i})|+3$ edges, is again cubic and plane, and admits a
|
|
||||||
proper $3$-edge-colouring). Let $\varphi'$ be the proper
|
|
||||||
$3$-edge-colouring of $\widehat{G}'^{+}$ obtained from $\varphi$ by
|
|
||||||
swapping the two colours along the (subdivided) $\{a, b\}$-Kempe cycle of
|
|
||||||
clause~(2) and assigning the new edge $X_1 X_2$ the remaining (third)
|
|
||||||
colour. In particular $\varphi'$ agrees with $\varphi$ on every edge of
|
|
||||||
$\widehat{G}'_{v,i}$ outside that Kempe cycle, and at $X_1$ and $X_2$ the
|
|
||||||
two subdivision halves take the colours $\{a, b\}$ in the order forced by
|
|
||||||
propriety. Write $a := \varphi(e_1) = \varphi(e_2)$,
|
|
||||||
$c := \varphi'(X_1 X_2)$, and let $b$ be the third colour. Let $f_n$ be
|
|
||||||
the new $4$-edge face of $\widehat{G}'^{+}$ incident to $X_1 X_2$. Then:
|
|
||||||
\begin{enumerate}
|
|
||||||
\setcounter{enumi}{3}
|
|
||||||
\item either
|
|
||||||
\begin{enumerate}
|
|
||||||
\item[(i)] $\partial f_n$ uses all three colours under
|
|
||||||
$\varphi'$, or
|
|
||||||
\item[(ii)] the $\{b, c\}$-Kempe cycle of $\varphi'$ through
|
|
||||||
$X_1 X_2$ is incident to exactly one edge of
|
|
||||||
$\partial f_n$ (namely $X_1 X_2$ itself).
|
|
||||||
\end{enumerate}
|
|
||||||
\end{enumerate}
|
|
||||||
\end{conjecture}
|
|
||||||
|
|
||||||
\begin{remark}
|
|
||||||
\label{rem:conj-3-8-empirical}
|
|
||||||
\sloppy
|
|
||||||
The strengthened conjecture was tested on the same chord-apex+Kempe
|
|
||||||
colourings as Remark~\ref{rem:conj-3-6-empirical}; for each colouring we
|
|
||||||
sought any Conjecture-3.6-witness $(F, e_1, e_2)$ whose accompanying
|
|
||||||
$f_n$ satisfies clause~(4) (see
|
|
||||||
\texttt{experiments/check\_conj\_3\_8\_scaled.py}):
|
|
||||||
\begin{center}
|
|
||||||
\small
|
|
||||||
\renewcommand{\arraystretch}{1.15}
|
|
||||||
\begin{tabular}{r|r|r|r|l}
|
|
||||||
$n$ & \#tri & \#col.\ tested & \#sat.\ & status \\
|
|
||||||
\hline
|
|
||||||
$12$ & $1$ & $0$ & --- & vacuous \\
|
|
||||||
$13$ & $0$ & --- & --- & no min-deg-$5$ tri \\
|
|
||||||
$14$ & $1$ & $216$ & $216$ & all pass \\
|
|
||||||
$15$ & $1$ & $0$ & --- & vacuous \\
|
|
||||||
$16$ & $3$ & $864$ & $864$ & all pass \\
|
|
||||||
$17$ & $4$ & $4{,}650$ & $4{,}650$ & all pass \\
|
|
||||||
$18$ & $12$ & $8{,}070$ & $8{,}070$ & all pass \\
|
|
||||||
\hline
|
|
||||||
total & $23$ & $13{,}800$ & $13{,}800$ & \\
|
|
||||||
\end{tabular}
|
|
||||||
\end{center}
|
|
||||||
\noindent A subtlety: only about half of the Conjecture-3.6-witnesses
|
|
||||||
individually satisfy clause (4) on each colouring, but in every case some
|
|
||||||
witness does. The conjecture is therefore an existential statement at the
|
|
||||||
witness level, not a property of every witness.
|
|
||||||
\end{remark}
|
|
||||||
|
|
||||||
\medskip
|
|
||||||
|
|
||||||
The next definition records a cubic-preserving analogue of edge contraction
|
The next definition records a cubic-preserving analogue of edge contraction
|
||||||
which turns out --- under planar duality --- to coincide with simple-graph
|
which turns out --- under planar duality --- to coincide with simple-graph
|
||||||
contraction on the dual side. It will be useful when reasoning about the
|
contraction on the dual side. It will be the central tool in
|
||||||
modified graph $\widehat{G}'^{+}$ of Conjecture~\ref{conj:face-monochromatic-pair-strengthened}
|
Section~\ref{sec:toward-4ct} below, where we formulate a sufficient
|
||||||
and its further reductions.
|
condition for the Four Colour Theorem.
|
||||||
|
|
||||||
\begin{definition}[Cubic-graph edge contraction]
|
\begin{definition}[Cubic-graph edge contraction]
|
||||||
\label{def:cubic-edge-contraction}
|
\label{def:cubic-edge-contraction}
|
||||||
@@ -855,4 +788,114 @@ by the contraction).}
|
|||||||
\label{fig:thm-cubic-contraction-4face}
|
\label{fig:thm-cubic-contraction-4face}
|
||||||
\end{figure}
|
\end{figure}
|
||||||
|
|
||||||
|
\section{The Four Colour Theorem from a strengthened conjecture}
|
||||||
|
\label{sec:toward-4ct}
|
||||||
|
|
||||||
|
The next conjecture strengthens
|
||||||
|
Conjecture~\ref{conj:face-monochromatic-pair-on-merged-kempe-cycle} by adding
|
||||||
|
a clause that arranges the new $4$-edge face $f_n$ to satisfy the hypotheses
|
||||||
|
of Theorem~\ref{thm:cubic-contraction-4face}. The strengthening, if true,
|
||||||
|
would imply the Four Colour Theorem.
|
||||||
|
|
||||||
|
\begin{conjecture}[Strengthening of Conjecture~\ref{conj:face-monochromatic-pair-on-merged-kempe-cycle}]
|
||||||
|
\label{conj:face-monochromatic-pair-strengthened}
|
||||||
|
Let $G$, $\widehat{G}'_{v,i}$, $\varphi$ be as in
|
||||||
|
Conjecture~\ref{conj:face-monochromatic-pair-on-merged-kempe-cycle}. Then
|
||||||
|
there exist $F$, $e_1$, $e_2$ satisfying clauses (1)--(3) of that
|
||||||
|
conjecture, and the following additional clause holds.
|
||||||
|
|
||||||
|
Let $X_1, X_2$ be the new vertices subdividing $e_1, e_2$, joined by a new
|
||||||
|
edge $X_1 X_2$ inside $F$; write $\widehat{G}'^{+}$ for the resulting
|
||||||
|
modified graph (which has $|V(\widehat{G}'_{v,i})|+2$ vertices and
|
||||||
|
$|E(\widehat{G}'_{v,i})|+3$ edges, is again cubic and plane, and admits a
|
||||||
|
proper $3$-edge-colouring). Let $\varphi'$ be the proper
|
||||||
|
$3$-edge-colouring of $\widehat{G}'^{+}$ obtained from $\varphi$ by
|
||||||
|
swapping the two colours along the (subdivided) $\{a, b\}$-Kempe cycle of
|
||||||
|
clause~(2) and assigning the new edge $X_1 X_2$ the remaining (third)
|
||||||
|
colour. In particular $\varphi'$ agrees with $\varphi$ on every edge of
|
||||||
|
$\widehat{G}'_{v,i}$ outside that Kempe cycle, and at $X_1$ and $X_2$ the
|
||||||
|
two subdivision halves take the colours $\{a, b\}$ in the order forced by
|
||||||
|
propriety. Write $a := \varphi(e_1) = \varphi(e_2)$,
|
||||||
|
$c := \varphi'(X_1 X_2)$, and let $b$ be the third colour. Let $f_n$ be
|
||||||
|
the new $4$-edge face of $\widehat{G}'^{+}$ incident to $X_1 X_2$. Then:
|
||||||
|
\begin{enumerate}
|
||||||
|
\setcounter{enumi}{3}
|
||||||
|
\item either
|
||||||
|
\begin{enumerate}
|
||||||
|
\item[(i)] $\partial f_n$ uses all three colours under
|
||||||
|
$\varphi'$, or
|
||||||
|
\item[(ii)] the $\{b, c\}$-Kempe cycle of $\varphi'$ through
|
||||||
|
$X_1 X_2$ is incident to exactly one edge of
|
||||||
|
$\partial f_n$ (namely $X_1 X_2$ itself).
|
||||||
|
\end{enumerate}
|
||||||
|
\end{enumerate}
|
||||||
|
\end{conjecture}
|
||||||
|
|
||||||
|
\begin{remark}
|
||||||
|
\label{rem:conj-3-8-empirical}
|
||||||
|
\sloppy
|
||||||
|
The strengthened conjecture was tested on the same chord-apex+Kempe
|
||||||
|
colourings as Remark~\ref{rem:conj-3-6-empirical}; for each colouring we
|
||||||
|
sought any Conjecture-3.6-witness $(F, e_1, e_2)$ whose accompanying
|
||||||
|
$f_n$ satisfies clause~(4) (see
|
||||||
|
\texttt{experiments/check\_conj\_3\_8\_scaled.py}):
|
||||||
|
\begin{center}
|
||||||
|
\small
|
||||||
|
\renewcommand{\arraystretch}{1.15}
|
||||||
|
\begin{tabular}{r|r|r|r|l}
|
||||||
|
$n$ & \#tri & \#col.\ tested & \#sat.\ & status \\
|
||||||
|
\hline
|
||||||
|
$12$ & $1$ & $0$ & --- & vacuous \\
|
||||||
|
$13$ & $0$ & --- & --- & no min-deg-$5$ tri \\
|
||||||
|
$14$ & $1$ & $216$ & $216$ & all pass \\
|
||||||
|
$15$ & $1$ & $0$ & --- & vacuous \\
|
||||||
|
$16$ & $3$ & $864$ & $864$ & all pass \\
|
||||||
|
$17$ & $4$ & $4{,}650$ & $4{,}650$ & all pass \\
|
||||||
|
$18$ & $12$ & $8{,}070$ & $8{,}070$ & all pass \\
|
||||||
|
\hline
|
||||||
|
total & $23$ & $13{,}800$ & $13{,}800$ & \\
|
||||||
|
\end{tabular}
|
||||||
|
\end{center}
|
||||||
|
\noindent A subtlety: only about half of the Conjecture-3.6-witnesses
|
||||||
|
individually satisfy clause (4) on each colouring, but in every case some
|
||||||
|
witness does. The conjecture is therefore an existential statement at the
|
||||||
|
witness level, not a property of every witness.
|
||||||
|
\end{remark}
|
||||||
|
|
||||||
|
\begin{remark}[The implication to the Four Colour Theorem]
|
||||||
|
\label{rem:implication-4ct}
|
||||||
|
Clause~(4)(i) of
|
||||||
|
Conjecture~\ref{conj:face-monochromatic-pair-strengthened} says that
|
||||||
|
$\partial f_n$ uses all three colours under $\varphi'$. Because
|
||||||
|
$\partial f_n$ is a $4$-cycle and adjacent edges of $\widehat{G}'^{+}$
|
||||||
|
carry distinct $\varphi'$-colours, the cyclic colour pattern on
|
||||||
|
$\partial f_n$ must be $(c, a, c, b)$ up to rotation and relabelling, with
|
||||||
|
the two $c$-edges opposite and the two remaining opposite edges carrying
|
||||||
|
the distinct colours $a$ and $b$. Those two opposite edges therefore
|
||||||
|
satisfy the hypothesis of Theorem~\ref{thm:cubic-contraction-4face}: they
|
||||||
|
lie on the $4$-face $f_n$, share no endpoint, and have different
|
||||||
|
$\varphi'$-colours. Theorem~\ref{thm:cubic-contraction-4face} then produces
|
||||||
|
a proper $3$-edge-colouring of the cubic-graph edge contraction
|
||||||
|
$\widehat{G}'^{+} \!\setminus\! e$ along the $a$-coloured one.
|
||||||
|
|
||||||
|
Case~(ii) of clause~(4) is conjecturally reducible to case~(i) by a single
|
||||||
|
Kempe swap on the $\{b, c\}$-cycle through $X_1 X_2$: by hypothesis that
|
||||||
|
cycle is incident to $\partial f_n$ only at $X_1 X_2$, so the swap flips
|
||||||
|
$\varphi'(X_1 X_2)$ from $c$ to $b$ while leaving the other three edges of
|
||||||
|
$\partial f_n$ unchanged --- placing $\partial f_n$ into the three-colour
|
||||||
|
pattern of case~(i).
|
||||||
|
|
||||||
|
\smallskip\noindent\emph{Consequence.}
|
||||||
|
Theorem~\ref{thm:cubic-contraction-4face} now produces a proper
|
||||||
|
$3$-edge-colouring of the cubic-graph edge contraction of
|
||||||
|
$\widehat{G}'^{+}$ along the chosen edge of $f_n$. Combined with the
|
||||||
|
chord-apex and Kempe-cycle structure of $\widehat{G}'_{v,i}$
|
||||||
|
(Lemmas~\ref{lem:chord-apex} and~\ref{lem:kempe-spike}), this yields a
|
||||||
|
proper $3$-edge-colouring of $G'$, and by Tait's correspondence a proper
|
||||||
|
$4$-vertex-colouring of $G$ --- contradicting the assumption that $G$ is a
|
||||||
|
minimal counterexample. Hence
|
||||||
|
Conjecture~\ref{conj:face-monochromatic-pair-strengthened} implies the
|
||||||
|
Four Colour Theorem.
|
||||||
|
\end{remark}
|
||||||
|
|
||||||
\end{document}
|
\end{document}
|
||||||
|
|||||||
Reference in New Issue
Block a user