\relax \providecommand\hyper@newdestlabel[2]{} \providecommand\HyperFirstAtBeginDocument{\AtBeginDocument} \HyperFirstAtBeginDocument{\ifx\hyper@anchor\@undefined \global\let\oldcontentsline\contentsline \gdef\contentsline#1#2#3#4{\oldcontentsline{#1}{#2}{#3}} \global\let\oldnewlabel\newlabel \gdef\newlabel#1#2{\newlabelxx{#1}#2} \gdef\newlabelxx#1#2#3#4#5#6{\oldnewlabel{#1}{{#2}{#3}}} \AtEndDocument{\ifx\hyper@anchor\@undefined \let\contentsline\oldcontentsline \let\newlabel\oldnewlabel \fi} \fi} \global\let\hyper@last\relax \gdef\HyperFirstAtBeginDocument#1{#1} \providecommand*\HyPL@Entry[1]{} \citation{Propp} \citation{Choc} \HyPL@Entry{0<>} \@writefile{toc}{\contentsline {section}{\numberline {1}Introduction}{1}{section.1}} \citation{Erdos} \citation{report} \citation{report} \@writefile{toc}{\contentsline {section}{\numberline {2}Binary fusion}{3}{section.2}} \newlabel{binaryFusion}{{2}{3}{Binary fusion}{section.2}{}} \@writefile{toc}{\contentsline {subsection}{\numberline {2.1}Number of ways to play}{3}{subsection.2.1}} \@writefile{lot}{\contentsline {table}{\numberline {1}{\ignorespaces The first few values of $f(m,n)$\relax }}{3}{table.caption.1}} \providecommand*\caption@xref[2]{\@setref\relax\@undefined{#1}} \newlabel{table:f}{{1}{3}{The first few values of $f(m,n)$\relax }{table.caption.1}{}} \@writefile{toc}{\contentsline {subsubsection}{\numberline {2.1.1}The recursion}{4}{subsubsection.2.1.1}} \newlabel{binaryParity}{{1}{4}{}{theorem.1}{}} \@writefile{toc}{\contentsline {subsubsection}{\numberline {2.1.2}General formula}{4}{subsubsection.2.1.2}} \newlabel{binaryWays}{{2}{4}{}{theorem.2}{}} \citation{OEIS} \citation{OEIS} \citation{OEIS} \citation{OEIS} \@writefile{toc}{\contentsline {subsubsection}{\numberline {2.1.3}Bijective proof}{6}{subsubsection.2.1.3}} \newlabel{CatBij}{{2.1.3}{6}{Bijective proof}{subsubsection.2.1.3}{}} \@writefile{toc}{\contentsline {subsection}{\numberline {2.2}Total number of paths}{6}{subsection.2.2}} \citation{OEIS} \citation{OEIS} \citation{OEIS} \@writefile{lof}{\contentsline {figure}{\numberline {1}{\ignorespaces Poset for $n=6$ over $\mathbb {Z}/2\mathbb {Z}$\relax }}{7}{figure.caption.2}} \newlabel{fig:6binary}{{1}{7}{Poset for $n=6$ over $\mathbb {Z}/2\mathbb {Z}$\relax }{figure.caption.2}{}} \@writefile{lof}{\contentsline {figure}{\numberline {2}{\ignorespaces Poset for $n=7$ over $\mathbb {Z}/2\mathbb {Z}$\relax }}{7}{figure.caption.2}} \newlabel{fig:7binary1}{{2}{7}{Poset for $n=7$ over $\mathbb {Z}/2\mathbb {Z}$\relax }{figure.caption.2}{}} \@writefile{toc}{\contentsline {subsection}{\numberline {2.3}Total number of edges and states}{7}{subsection.2.3}} \citation{OEIS} \citation{OEIS} \@writefile{toc}{\contentsline {section}{\numberline {3}Refining partitions: the game over $\mathbb {Z}$}{8}{section.3}} \newlabel{overZ}{{3}{8}{Refining partitions: the game over $\mathbb {Z}$}{section.3}{}} \newlabel{fig:7overZ}{{3a}{8}{over $\mathbb {Z}$\relax }{figure.caption.3}{}} \newlabel{sub@fig:7overZ}{{a}{8}{over $\mathbb {Z}$\relax }{figure.caption.3}{}} \newlabel{fig:7binary2}{{3b}{8}{over $\mathbb {Z}/2\mathbb {Z}$\relax }{figure.caption.3}{}} \newlabel{sub@fig:7binary2}{{b}{8}{over $\mathbb {Z}/2\mathbb {Z}$\relax }{figure.caption.3}{}} \@writefile{lof}{\contentsline {figure}{\numberline {3}{\ignorespaces Posets for $n=7$ side by side\relax }}{8}{figure.caption.3}} \newlabel{fig:test}{{3}{8}{Posets for $n=7$ side by side\relax }{figure.caption.3}{}} \citation{OEIS} \citation{OEIS} \citation{OEIS} \@writefile{toc}{\contentsline {section}{\numberline {4}Playing in modulo 3}{9}{section.4}} \newlabel{mod3}{{4}{9}{Playing in modulo 3}{section.4}{}} \@writefile{toc}{\contentsline {subsection}{\numberline {4.1}Number of ways to play}{9}{subsection.4.1}} \@writefile{toc}{\contentsline {subsection}{\numberline {4.2}Total number of edges and states}{9}{subsection.4.2}} \@writefile{lof}{\contentsline {figure}{\numberline {4}{\ignorespaces Poset for $n=7$ over $\mathbb {Z}/3\mathbb {Z}$\relax }}{10}{figure.caption.4}} \newlabel{fig:7mod3}{{4}{10}{Poset for $n=7$ over $\mathbb {Z}/3\mathbb {Z}$\relax }{figure.caption.4}{}} \@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces The partitions of $7$ corresponding to the nodes in Figure\nobreakspace {}\ref {fig:7mod3}\relax }}{10}{figure.caption.4}} \newlabel{fig:7mod3partitions}{{5}{10}{The partitions of $7$ corresponding to the nodes in Figure~\ref {fig:7mod3}\relax }{figure.caption.4}{}} \citation{OEIS} \citation{OEIS} \@writefile{toc}{\contentsline {section}{\numberline {5}Number of ways to play over polynomial rings over $\mathbb {Z}/2\mathbb {Z}$}{11}{section.5}} \newlabel{withX}{{5}{11}{Number of ways to play over polynomial rings over $\mathbb {Z}/2\mathbb {Z}$}{section.5}{}} \citation{OEIS} \bibcite{Choc}{1} \@writefile{lof}{\contentsline {figure}{\numberline {6}{\ignorespaces Poset for $f(1, 1, 3)$ \relax }}{12}{figure.caption.5}} \newlabel{fig:Mot3}{{6}{12}{Poset for $f(1, 1, 3)$ \relax }{figure.caption.5}{}} \@writefile{lof}{\contentsline {figure}{\numberline {7}{\ignorespaces Coordinates of the king-path corresponding to Figure\nobreakspace {}\ref {fig:Mot3}\relax }}{12}{figure.caption.5}} \newlabel{fig:MotCoor}{{7}{12}{Coordinates of the king-path corresponding to Figure~\ref {fig:Mot3}\relax }{figure.caption.5}{}} \@writefile{toc}{\contentsline {section}{\numberline {6}Acknowledgments}{12}{section.6}} \bibcite{report}{2} \bibcite{Erdos}{3} \bibcite{OEIS}{4} \bibcite{Propp}{5}