\relax \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{\let \contentsline\oldcontentsline \let \newlabel\oldnewlabel} \else \global \let \hyper@last\relax \fi \citation{Baxter} \citation{Roth} \citation{Calkin} \citation{Burstein} \@writefile{toc}{\contentsline {section}{\numberline {1}Introduction}{1}{section.1}} \citation{Hartmann} \citation{Engel} \citation{Stewart} \citation{Engel} \citation{Stanley} \@writefile{toc}{\contentsline {section}{\numberline {2}The transfer matrix method for the calculation of $i(m,n)$}{2}{section.2}} \citation{Sloane} \newlabel{1star}{{1}{3}{The transfer matrix method for the calculation of $i(m,n)$\relax }{equation.1}{}} \newlabel{2star}{{2}{3}{The transfer matrix method for the calculation of $i(m,n)$\relax }{equation.2}{}} \citation{Stewart} \@writefile{toc}{\contentsline {section}{\numberline {3}${\@mathcal {B}}_{1,n}$ and ${\@mathcal {B}}_{2,n}$, their structure and cardinality}{6}{section.3}} \@writefile{lof}{\contentsline {figure}{\numberline {1}{\ignorespaces The basis $B=\{(1,1),(1,4),(1,6),\ldots ,(1,n-2),(1,n)\}$ for $m=1$.}}{6}{figure.1}} \newlabel{Figure 1}{{1}{6}{${\mathcal {B}}_{1,n}$ and ${\mathcal {B}}_{2,n}$, their structure and cardinality\relax }{figure.1}{}} \newlabel{Padovan}{{3}{6}{${\mathcal {B}}_{1,n}$ and ${\mathcal {B}}_{2,n}$, their structure and cardinality\relax }{equation.3}{}} \@writefile{lof}{\contentsline {figure}{\numberline {2}{\ignorespaces A basis for $m=2$.}}{7}{figure.2}} \newlabel{Figure 2}{{2}{7}{${\mathcal {B}}_{1,n}$ and ${\mathcal {B}}_{2,n}$, their structure and cardinality\relax }{figure.2}{}} \newlabel{Fibonacci}{{4}{7}{${\mathcal {B}}_{1,n}$ and ${\mathcal {B}}_{2,n}$, their structure and cardinality\relax }{equation.4}{}} \@writefile{toc}{\contentsline {section}{\numberline {4}${\@mathcal {B}}_{3,n}$ and the general case}{7}{section.4}} \@writefile{lof}{\contentsline {figure}{\numberline {3}{\ignorespaces Substructures of a basis $B \in {\@mathcal {B}}_{m,2}.$}}{9}{figure.3}} \newlabel{Figure 3}{{3}{9}{${\mathcal {B}}_{3,n}$ and the general case\relax }{figure.3}{}} \@writefile{lof}{\contentsline {figure}{\numberline {4}{\ignorespaces Generation of ${\@mathcal {B}}_{m,3}$ from ${\@mathcal {B}}_{m,2}$ and the 8 representing graphs $P_{m,2}.$}}{10}{figure.4}} \newlabel{Figure 4}{{4}{10}{${\mathcal {B}}_{3,n}$ and the general case\relax }{figure.4}{}} \@writefile{toc}{\contentsline {section}{\numberline {5}The cases $m=3,4,5$}{11}{section.5}} \@writefile{lof}{\contentsline {figure}{\numberline {5}{\ignorespaces Representing graphs for $m=3$.}}{11}{figure.5}} \newlabel{Figure 5}{{5}{11}{The cases $m=3,4,5$\relax }{figure.5}{}} \@writefile{lof}{\contentsline {figure}{\numberline {6}{\ignorespaces Representing graphs for $m=4$.}}{12}{figure.6}} \newlabel{Figure 6}{{6}{12}{The cases $m=3,4,5$\relax }{figure.6}{}} \@writefile{lof}{\contentsline {figure}{\numberline {7}{\ignorespaces Representing graphs for $m=5$.}}{13}{figure.7}} \newlabel{Figure 7}{{7}{13}{The cases $m=3,4,5$\relax }{figure.7}{}} \citation{Sloane} \bibcite{Baxter}{1} \bibcite{Burstein}{2} \bibcite{Calkin}{3} \bibcite{Engel}{4} \bibcite{Roth}{5} \bibcite{Sloane}{6} \bibcite{Stanley}{7} \bibcite{Stewart}{8} \@writefile{toc}{\contentsline {section}{\numberline {6}Conclusion}{15}{section.6}} \@writefile{toc}{\contentsline {section}{\numberline {7}Acknowledgments}{15}{section.7}} \bibcite{Hartmann}{9}