coloring_nested_tire_graphs: add Definition 1.15 (partial tire facial dual)

Adds a new definition formalizing the "partial tire facial dual" T'_{f'}: (i) Annular dual subgraph T'_ann := G'[{d_f : f ∈ F_ann}], with planar embedding inherited from G' (where G' is the inner planar dual of the maximal planar G). (ii) For each face f' of T'_ann in its inherited embedding, T'_{f'} := closed G'-neighborhood of V(f') together with every G'-edge incident to V(f'). Adds a remark noting that in the spoke-only case T'_ann = Γ ≅ C_{n+m} has two faces (both with V(f') = all interior dual vertices), and T'_{f'} recovers the planar dual of T when G is the tire plus one source-side and one O-side face. Paper stays at 9 pages. Co-Authored-By: Claude Opus 4.7 <noreply@anthropic.com>
2026-05-25 22:37:03 -04:00
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 \newlabel{tocindent2}{0pt}
 \newlabel{tocindent3}{0pt}
 \newlabel{rem:edge-vertex-corollary}{{1.14}{9}}
 \newlabel{def:partial-tire-facial-dual}{{1.15}{9}}
 \newlabel{rem:facial-dual-spoke-only}{{1.16}{9}}
 \@writefile{toc}{\contentsline {section}{\tocsection {}{}{References}}{9}{}\protected@file@percent }
 \gdef \@abspage@last{9}
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@@ -569,6 +569,59 @@ itself; its color is freely determined as the missing third color at
 its attached interior vertex.
 \end{remark}
 \begin{definition}[Partial tire facial dual]
 \label{def:partial-tire-facial-dual}
 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.
 \smallskip
 \noindent\textbf{(i) Annular dual subgraph.}  Define
 \[
  T'_{\mathrm{ann}} \;:=\; G'\bigl[\,\{d_f : f \in F_{\mathrm{ann}}\}\,\bigr],
 \]
 the subgraph of $G'$ induced on the dual vertices corresponding to the
 annular faces of $T$.  Equip $T'_{\mathrm{ann}}$ with the planar
 embedding inherited from $G'$ (which, by deletion of vertices outside
 the annulus, remains a planar embedding of $T'_{\mathrm{ann}}$ in the
 sense of $\Pi_G$).
 \smallskip
 \noindent\textbf{(ii) Partial tire facial dual.}  For each face $f'$
 of $T'_{\mathrm{ann}}$ in its inherited embedding, let
 $V(f') \subseteq V(T'_{\mathrm{ann}})$ denote the set of vertices on
 the boundary walk of $f'$.  Define the \emph{partial tire facial
 dual at $f'$} to be the subgraph
 \[
  T'_{f'} \;:=\; \bigl(\,V(f') \cup N_{G'}(V(f'))\,,\;
                       \{\,e \in E(G') : e \text{ is incident to } V(f')\,\}\,\bigr)
                \;\subseteq\; G',
 \]
 i.e.\ the subgraph of $G'$ on the closed $G'$-neighborhood of $V(f')$
 together with every $G'$-edge incident to $V(f')$.
 \end{definition}
 \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 $T'_{\mathrm{ann}} = \Gamma \cong C_{n+m}$
 (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
 $V(f') = V(\Gamma)$ for either choice of $f'$.  Each interior dual
 vertex $d_f$ has $G'$-degree $3$ (since $G$ is a triangulation), of
 which two edges lie in $\Gamma$ (cycle edges) and one edge points to a
 single non-annular face of $G$.  Consequently $T'_{f'}$ has $n + m$
 interior vertices plus the non-annular face vertices to which they
 connect, and is independent of the choice of $f'$.  When $G$ consists
 only of the tire $T$ together with one source-side face inside
 $B_{\mathrm{out}}$ and one $O$-side face inside $B_{\mathrm{in}}$,
 $T'_{f'}$ recovers the planar dual of $T$ itself.
 \end{remark}
 \begin{thebibliography}{9}
 \bibitem{bauerfeld-pds}