coloring_nested_tire_graphs: rename "annular dual subgraph" → "tire annular subgraph"; revert symbol to T'_ann
Revert the previous renaming of G'_ann; the symbol is back to T'_ann. The CONCEPT NAME is changed from "annular dual subgraph" to "tire annular subgraph" to clarify it's the tire's annular portion as seen in G'. Updates: - Definition 1.15 retitled "Tire annular subgraph" - Label changed to def:tire-annular-subgraph - Cross-references in Definition 1.16 and the spoke-only remark - Figure suptitle reverted to T'_ann - Regenerated fig_facial_dual_choices.png Paper stays at 10 pages. Co-Authored-By: Claude Opus 4.7 <noreply@anthropic.com>
This commit is contained in:
@@ -156,7 +156,7 @@ def main():
|
||||
face_shade=shadeC)
|
||||
|
||||
fig.suptitle(r"Partial tire facial dual $T'_{f'}$ for the bridge case " +
|
||||
r"($G'_{\mathrm{ann}} = \theta(1,3,3)$, three faces $A,B,C$)" + "\n" +
|
||||
r"($T'_{\mathrm{ann}} = \theta(1,3,3)$, three faces $A,B,C$)" + "\n" +
|
||||
r"Blue: edges of $T'_{f'}$. Dark circles: $V(f')$. " +
|
||||
r"Red squares: external $G'$-neighbors $u_v$ included via $v \in V(f')$.",
|
||||
fontsize=11, y=1.02)
|
||||
|
||||
Binary file not shown.
|
Before Width: | Height: | Size: 74 KiB After Width: | Height: | Size: 74 KiB |
@@ -27,10 +27,10 @@
|
||||
\newlabel{tocindent2}{0pt}
|
||||
\newlabel{tocindent3}{0pt}
|
||||
\newlabel{rem:edge-vertex-corollary}{{1.14}{9}}
|
||||
\newlabel{def:annular-dual-subgraph}{{1.15}{9}}
|
||||
\newlabel{def:tire-annular-subgraph}{{1.15}{9}}
|
||||
\newlabel{def:partial-tire-facial-dual}{{1.16}{9}}
|
||||
\newlabel{rem:facial-dual-spoke-only}{{1.17}{9}}
|
||||
\@writefile{toc}{\contentsline {section}{\tocsection {}{}{References}}{9}{}\protected@file@percent }
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The bridge case: $G'_{\mathrm {ann}} = \theta (1, 3, 3)$ has three faces $A, B, C$ in its inherited embedding, with respective vertex sets $V(A) = \{v_0, \dots , v_5\}$, $V(B) = \{v_0, v_1, v_2, v_3\}$, and $V(C) = \{v_0, v_3, v_4, v_5\}$. In the surrounding maximal planar $G$, the chord endpoints $v_0, v_3$ (the two annular faces sharing the bridge edge) have all three $G'$-edges inside $G'_{\mathrm {ann}}$, while each non-chord vertex $v_i$ ($i \in \{1, 2, 4, 5\}$) contributes one $G'$-edge to an external non-annular neighbor $u_i$. Each panel highlights $T'_{f'}$ (blue) inside $G'$: dark circles are $V(f')$, gray circles are $G'$-neighbors of $V(f')$ within $G'_{\mathrm {ann}}$, and red squares are external $G'$-neighbors $u_i$. The choice of face $f'$ controls which external neighbors $u_i$ are pulled into $T'_{f'}$ (face $A$ pulls in all four; face $B$ pulls in $u_1, u_2$ and face $C$ pulls in $u_4, u_5$).}}{10}{}\protected@file@percent }
|
||||
\@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The bridge case: $T'_{\mathrm {ann}} = \theta (1, 3, 3)$ has three faces $A, B, C$ in its inherited embedding, with respective vertex sets $V(A) = \{v_0, \dots , v_5\}$, $V(B) = \{v_0, v_1, v_2, v_3\}$, and $V(C) = \{v_0, v_3, v_4, v_5\}$. In the surrounding maximal planar $G$, the chord endpoints $v_0, v_3$ (the two annular faces sharing the bridge edge) have all three $G'$-edges inside $T'_{\mathrm {ann}}$, while each non-chord vertex $v_i$ ($i \in \{1, 2, 4, 5\}$) contributes one $G'$-edge to an external non-annular neighbor $u_i$. Each panel highlights $T'_{f'}$ (blue) inside $G'$: dark circles are $V(f')$, gray circles are $G'$-neighbors of $V(f')$ within $T'_{\mathrm {ann}}$, and red squares are external $G'$-neighbors $u_i$. The choice of face $f'$ controls which external neighbors $u_i$ are pulled into $T'_{f'}$ (face $A$ pulls in all four; face $B$ pulls in $u_1, u_2$ and face $C$ pulls in $u_4, u_5$).}}{10}{}\protected@file@percent }
|
||||
\newlabel{fig:facial-dual-choices}{{5}{10}}
|
||||
\gdef \@abspage@last{10}
|
||||
|
||||
@@ -1,4 +1,4 @@
|
||||
This is pdfTeX, Version 3.141592653-2.6-1.40.24 (TeX Live 2022) (preloaded format=pdflatex 2022.10.5) 25 MAY 2026 22:46
|
||||
This is pdfTeX, Version 3.141592653-2.6-1.40.24 (TeX Live 2022) (preloaded format=pdflatex 2022.10.5) 25 MAY 2026 22:49
|
||||
entering extended mode
|
||||
restricted \write18 enabled.
|
||||
%&-line parsing enabled.
|
||||
@@ -266,7 +266,7 @@ ve/2022/texmf-dist/fonts/type1/public/amsfonts/cm/cmsy5.pfb></usr/local/texlive
|
||||
022/texmf-dist/fonts/type1/public/amsfonts/cm/cmti10.pfb></usr/local/texlive/20
|
||||
22/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 (10 pages, 813723 bytes).
|
||||
Output written on paper.pdf (10 pages, 813353 bytes).
|
||||
PDF statistics:
|
||||
128 PDF objects out of 1000 (max. 8388607)
|
||||
73 compressed objects within 1 object stream
|
||||
|
||||
Binary file not shown.
@@ -569,30 +569,30 @@ itself; its color is freely determined as the missing third color at
|
||||
its attached interior vertex.
|
||||
\end{remark}
|
||||
|
||||
\begin{definition}[Annular dual subgraph]
|
||||
\label{def:annular-dual-subgraph}
|
||||
\begin{definition}[Tire annular subgraph]
|
||||
\label{def:tire-annular-subgraph}
|
||||
Let $G$ be a maximal planar graph with embedding $\Pi_G$ and inner
|
||||
planar dual $G'$ (as in Definition~\ref{def:dual} above). Let
|
||||
$T = (B_{\mathrm{out}}, O, E_{\mathrm{ann}}) \subseteq G$ be a tire
|
||||
graph (Definition~\ref{def:tire-graph}), and let
|
||||
$F_{\mathrm{ann}} \subseteq F(G)$ denote its set of annular faces.
|
||||
The \emph{annular dual subgraph} of $T$ in $G'$ is
|
||||
The \emph{tire annular subgraph} of $T$ in $G'$ is
|
||||
\[
|
||||
G'_{\mathrm{ann}} \;:=\; G'\bigl[\,\{d_f : f \in F_{\mathrm{ann}}\}\,\bigr],
|
||||
T'_{\mathrm{ann}} \;:=\; G'\bigl[\,\{d_f : f \in F_{\mathrm{ann}}\}\,\bigr],
|
||||
\]
|
||||
the subgraph of $G'$ induced on the dual vertices corresponding to the
|
||||
annular faces of $T$. We equip $G'_{\mathrm{ann}}$ with the planar
|
||||
annular faces of $T$. We equip $T'_{\mathrm{ann}}$ with the planar
|
||||
embedding inherited from $G'$ (which, by deletion of vertices outside
|
||||
the annulus, remains a planar embedding of $G'_{\mathrm{ann}}$ in the
|
||||
the annulus, remains a planar embedding of $T'_{\mathrm{ann}}$ in the
|
||||
sense of $\Pi_G$).
|
||||
\end{definition}
|
||||
|
||||
\begin{definition}[Partial tire facial dual]
|
||||
\label{def:partial-tire-facial-dual}
|
||||
With $G, G', T$ as in
|
||||
Definition~\ref{def:annular-dual-subgraph}, let $f'$ be a face of the
|
||||
annular dual subgraph $G'_{\mathrm{ann}}$ in its inherited embedding,
|
||||
and let $V(f') \subseteq V(G'_{\mathrm{ann}})$ denote the set of
|
||||
Definition~\ref{def:tire-annular-subgraph}, let $f'$ be a face of the
|
||||
tire annular subgraph $T'_{\mathrm{ann}}$ in its inherited embedding,
|
||||
and let $V(f') \subseteq V(T'_{\mathrm{ann}})$ denote the set of
|
||||
vertices on the boundary walk of $f'$. The \emph{partial tire facial
|
||||
dual at $f'$} is the subgraph
|
||||
\[
|
||||
@@ -607,8 +607,8 @@ together with every $G'$-edge incident to $V(f')$.
|
||||
\begin{remark}
|
||||
\label{rem:facial-dual-spoke-only}
|
||||
In the spoke-only setting of
|
||||
Proposition~\ref{prop:partial-tire-dual-structure}, the annular
|
||||
dual subgraph is $G'_{\mathrm{ann}} = \Gamma \cong C_{n+m}$
|
||||
Proposition~\ref{prop:partial-tire-dual-structure}, the tire annular
|
||||
subgraph is $T'_{\mathrm{ann}} = \Gamma \cong C_{n+m}$
|
||||
(Proposition~\ref{prop:edge-vertex-bijection}). This cycle has exactly
|
||||
two faces in its inherited embedding -- one on each side of the cycle
|
||||
in $\Pi_G$ -- and both face boundaries traverse all $n+m$ vertices, so
|
||||
@@ -627,16 +627,16 @@ $T'_{f'}$ recovers the planar dual of $T$ itself.
|
||||
\centering
|
||||
\includegraphics[width=\textwidth]{notes/fig_facial_dual_choices.png}
|
||||
\caption{\label{fig:facial-dual-choices}
|
||||
The bridge case: $G'_{\mathrm{ann}} = \theta(1, 3, 3)$ has three faces
|
||||
The bridge case: $T'_{\mathrm{ann}} = \theta(1, 3, 3)$ has three faces
|
||||
$A, B, C$ in its inherited embedding, with respective vertex sets
|
||||
$V(A) = \{v_0, \dots, v_5\}$, $V(B) = \{v_0, v_1, v_2, v_3\}$, and
|
||||
$V(C) = \{v_0, v_3, v_4, v_5\}$. In the surrounding maximal planar
|
||||
$G$, the chord endpoints $v_0, v_3$ (the two annular faces sharing
|
||||
the bridge edge) have all three $G'$-edges inside $G'_{\mathrm{ann}}$,
|
||||
the bridge edge) have all three $G'$-edges inside $T'_{\mathrm{ann}}$,
|
||||
while each non-chord vertex $v_i$ ($i \in \{1, 2, 4, 5\}$) contributes
|
||||
one $G'$-edge to an external non-annular neighbor $u_i$. Each panel
|
||||
highlights $T'_{f'}$ (blue) inside $G'$: dark circles are $V(f')$,
|
||||
gray circles are $G'$-neighbors of $V(f')$ within $G'_{\mathrm{ann}}$,
|
||||
gray circles are $G'$-neighbors of $V(f')$ within $T'_{\mathrm{ann}}$,
|
||||
and red squares are external $G'$-neighbors $u_i$. The choice of
|
||||
face $f'$ controls which external neighbors $u_i$ are pulled into
|
||||
$T'_{f'}$ (face $A$ pulls in all four; face $B$ pulls in $u_1, u_2$
|
||||
|
||||
Reference in New Issue
Block a user