References etc.
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Antti H S Laaksonen
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@ -342,7 +342,8 @@ corresponds to the binomial coefficient formula.
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\index{Catalan number}
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The \key{Catalan number} $C_n$ equals the
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The \key{Catalan number}\footnote{E. C. Catalan (1814--1894)
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was a Belgian mathematician.} $C_n$ equals the
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number of valid
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parenthesis expressions that consist of
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$n$ left parentheses and $n$ right parentheses.
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@ -678,7 +679,8 @@ elements should be changed.
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\index{Burnside's lemma}
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\key{Burnside's lemma} can be used to count
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\key{Burnside's lemma}\footnote{Actually, Burnside did not discover this lemma;
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he only mentioned it in his book \cite{bur97}.} can be used to count
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the number of combinations so that
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only one representative is counted
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for each group of symmetric combinations.
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@ -764,7 +766,10 @@ with 3 colors is
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\index{Cayley's formula}
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\key{Cayley's formula} states that
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\key{Cayley's formula}\footnote{While the formula
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is named after A. Cayley,
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who studied it in 1889,
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it was discovered earlier by C. W. Borchardt in 1860.} states that
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there are $n^{n-2}$ labeled trees
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that contain $n$ nodes.
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The nodes are labeled $1,2,\ldots,n$,
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@ -827,7 +832,8 @@ be derived using Prüfer codes.
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\index{Prüfer code}
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A \key{Prüfer code} is a sequence of
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A \key{Prüfer code}\footnote{In 1918, H. Prüfer proved
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Cayley's theorem using Prüfer codes \cite{pru18}.} is a sequence of
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$n-2$ numbers that describes a labeled tree.
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The code is constructed by following a process
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that removes $n-2$ leaves from the tree.
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10
list.tex
10
list.tex
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@ -40,6 +40,11 @@
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Nim, a game with a complete mathematical theory.
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\emph{Annals of Mathematics}, 3(1/4):35--39, 1901.
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\bibitem{bur97}
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W. Burnside.
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\emph{Theory of Groups of Finite Order},
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Cambridge University Press, 1897.
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\bibitem{cod15}
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Codeforces: On ''Mo's algorithm'',
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\url{http://codeforces.com/blog/entry/20032}
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@ -242,6 +247,11 @@
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Shortest connection networks and some generalizations.
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\emph{Bell System Technical Journal}, 36(6):1389--1401, 1957.
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\bibitem{pru18}
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H. Prüfer.
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Neuer Beweis eines Satzes über Permutationen.
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\emph{Arch. Math. Phys}, 27:742--744, 1918.
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\bibitem{q27}
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27-Queens Puzzle: Massively Parallel Enumeration and Solution Counting.
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\url{https://github.com/preusser/q27}
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