Lead motivation with the flip-neighborhood claim, not flip-symmetry

The original framing presented flip-symmetry as the principal property and the stronger statement (every flip-neighbor of $G_0$ is 4-colorable) as a parenthetical. Reverse the emphasis: lead with the stronger claim, derive flip-asymmetry as a corollary, then introduce the colored edge flip class and Theorem 4.5 to preview the fine-grained per-coloring version of the same rigidity. Co-Authored-By: Claude Opus 4.7 <noreply@anthropic.com>
2026-05-14 03:19:21 -04:00
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 \newlabel{def:flip-symmetric}{{3.1}{2}}
 \newlabel{def:flip-neighborhood}{{3.2}{2}}
 \newlabel{def:colored-flip-class}{{3.3}{2}}
@@ -11,7 +11,6 @@
 \newlabel{lem:edge-deletion-4colorable}{{4.2}{2}}
 \newlabel{lem:edge-deletion-coloring-structure}{{4.3}{3}}
 \newlabel{thm:min-five-chromatic-not-flip-symmetric}{{4.4}{3}}
-\newlabel{thm:no-colored-class-contains-G}{{4.5}{3}}
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 \newlabel{fig:flip-proof-case-two}{{2}{4}}
+\newlabel{thm:no-colored-class-contains-G}{{4.5}{4}}
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 []\OT1/cmr/bx/n/10 Definition 3.1 \OT1/cmr/m/n/10 (Flip-sym-met-ric graph)\OT1/
 cmr/bx/n/10 . []\OT1/cmr/m/n/10 A max-i-mal pla-nar graph $\OML/cmm/m/it/10 G$ 
 \OT1/cmr/m/n/10 is \OT1/cmr/m/it/10 flip-symmetric
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@@ -91,16 +91,30 @@ property shared by every maximal planar graph $H$ with $|V(H)| =
 maximal planar graphs from playing the role of a minimum
 counterexample.

-This paper investigates one such property: behavior under an edge
-flip.  Our principal observation
+Our principal observation
 (Theorem~\ref{thm:min-five-chromatic-not-flip-symmetric}) is that
-every edge flip of a minimum-order $5$-chromatic maximal planar graph
-yields a $4$-colorable graph.  In particular, no such graph is
-\emph{flip-symmetric}, where we call a maximal planar graph $G$
-flip-symmetric when some admissible flip at an edge of $G$ returns a
-graph isomorphic to $G$.  The search for a counterexample to the Four
-Color Theorem may therefore be confined to the complement of the
-class $\mathcal{F}$ of flip-symmetric graphs.
+every graph in the \emph{flip neighborhood} of $G_0$ --- the set
+$\mathcal{N}(G_0)$ of maximal planar graphs obtainable from $G_0$ by
+a single admissible edge flip --- is $4$-colorable.  In other words,
+$G_0$ sits at the boundary of $4$-colorability: a single flip in any
+direction yields a $4$-colorable graph.  As an immediate corollary,
+no such $G_0$ is \emph{flip-symmetric}, where we call a maximal
+planar graph $G$ flip-symmetric when some admissible flip at an edge
+of $G$ returns a graph isomorphic to $G$; if any flip of $G_0$ were
+to return $G_0$, that flip would witness $G_0$ as $4$-colorable.  The
+search for a counterexample to the Four Color Theorem may therefore
+be confined to the complement of the class $\mathcal{F}$ of
+flip-symmetric maximal planar graphs.
+
+To track this rigidity at the level of individual $4$-colorings, we
+introduce the \emph{colored edge flip class}
+$\mathcal{C}(H, \varphi)$ of a maximal planar graph $H$ and a proper
+$4$-coloring $\varphi$ of $H$: the set of maximal planar graphs
+reachable from $H$ by sequences of admissible edge flips that each
+preserve $\varphi$.  Theorem~\ref{thm:no-colored-class-contains-G}
+records that $G_0 \notin \mathcal{C}(H, \varphi)$ for any
+$H \in \mathcal{N}(G_0)$ and any proper $4$-coloring $\varphi$ of
+$H$.

 \section{Preliminaries}