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- <h1>CodeMirror 2: sTeX mode</h1>
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- \begin{module}[id=bbt-size]
- \importmodule[balanced-binary-trees]{balanced-binary-trees}
- \importmodule[\KWARCslides{dmath/en/cardinality}]{cardinality}
- \begin{frame}
- \frametitle{Size Lemma for Balanced Trees}
- \begin{itemize}
- \item
- \begin{assertion}[id=size-lemma,type=lemma]
- Let $G=\tup{V,E}$ be a \termref[cd=binary-trees]{balanced binary tree}
- of \termref[cd=graph-depth,name=vertex-depth]{depth}$n>i$, then the set
- $\defeq{\livar{V}i}{\setst{\inset{v}{V}}{\gdepth{v} = i}}$ of
- \termref[cd=graphs-intro,name=node]{nodes} at
- \termref[cd=graph-depth,name=vertex-depth]{depth} $i$ has
- \termref[cd=cardinality,name=cardinality]{cardinality} $\power2i$.
- \end{assertion}
- \item
- \begin{sproof}[id=size-lemma-pf,proofend=,for=size-lemma]{via induction over the depth $i$.}
- \begin{spfcases}{We have to consider two cases}
- \begin{spfcase}{$i=0$}
- \begin{spfstep}[display=flow]
- then $\livar{V}i=\set{\livar{v}r}$, where $\livar{v}r$ is the root, so
- $\eq{\card{\livar{V}0},\card{\set{\livar{v}r}},1,\power20}$.
- \end{spfstep}
- \end{spfcase}
- \begin{spfcase}{$i>0$}
- \begin{spfstep}[display=flow]
- then $\livar{V}{i-1}$ contains $\power2{i-1}$ vertexes
- \begin{justification}[method=byIH](IH)\end{justification}
- \end{spfstep}
- \begin{spfstep}
- By the \begin{justification}[method=byDef]definition of a binary
- tree\end{justification}, each $\inset{v}{\livar{V}{i-1}}$ is a leaf or has
- two children that are at depth $i$.
- \end{spfstep}
- \begin{spfstep}
- As $G$ is \termref[cd=balanced-binary-trees,name=balanced-binary-tree]{balanced} and $\gdepth{G}=n>i$, $\livar{V}{i-1}$ cannot contain
- leaves.
- \end{spfstep}
- \begin{spfstep}[type=conclusion]
- Thus $\eq{\card{\livar{V}i},{\atimes[cdot]{2,\card{\livar{V}{i-1}}}},{\atimes[cdot]{2,\power2{i-1}}},\power2i}$.
- \end{spfstep}
- \end{spfcase}
- \end{spfcases}
- \end{sproof}
- \item
- \begin{assertion}[id=fbbt,type=corollary]
- A fully balanced tree of depth $d$ has $\power2{d+1}-1$ nodes.
- \end{assertion}
- \item
- \begin{sproof}[for=fbbt,id=fbbt-pf]{}
- \begin{spfstep}
- Let $\defeq{G}{\tup{V,E}}$ be a fully balanced tree
- \end{spfstep}
- \begin{spfstep}
- Then $\card{V}=\Sumfromto{i}1d{\power2i}= \power2{d+1}-1$.
- \end{spfstep}
- \end{sproof}
- \end{itemize}
- \end{frame}
- \begin{note}
- \begin{omtext}[type=conclusion,for=binary-tree]
- This shows that balanced binary trees grow in breadth very quickly, a consequence of
- this is that they are very shallow (and this compute very fast), which is the essence of
- the next result.
- \end{omtext}
- \end{note}
- \end{module}
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