Identifier
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Mp00081:
Standard tableaux
—reading word permutation⟶
Permutations
Mp00067: Permutations —Foata bijection⟶ Permutations
Mp00325: Permutations —ones to leading⟶ Permutations
St000054: Permutations ⟶ ℤ
Values
[[1]] => [1] => [1] => [1] => 1
[[1,2]] => [1,2] => [1,2] => [1,2] => 1
[[1],[2]] => [2,1] => [2,1] => [2,1] => 2
[[1,2,3]] => [1,2,3] => [1,2,3] => [1,2,3] => 1
[[1,3],[2]] => [2,1,3] => [2,1,3] => [1,3,2] => 1
[[1,2],[3]] => [3,1,2] => [1,3,2] => [2,3,1] => 2
[[1],[2],[3]] => [3,2,1] => [3,2,1] => [3,2,1] => 3
[[1,2,3,4]] => [1,2,3,4] => [1,2,3,4] => [1,2,3,4] => 1
[[1,3,4],[2]] => [2,1,3,4] => [2,1,3,4] => [1,3,2,4] => 1
[[1,2,4],[3]] => [3,1,2,4] => [1,3,2,4] => [1,2,4,3] => 1
[[1,2,3],[4]] => [4,1,2,3] => [1,2,4,3] => [2,3,4,1] => 2
[[1,3],[2,4]] => [2,4,1,3] => [2,1,4,3] => [2,4,3,1] => 2
[[1,2],[3,4]] => [3,4,1,2] => [1,3,4,2] => [2,3,1,4] => 2
[[1,4],[2],[3]] => [3,2,1,4] => [3,2,1,4] => [1,4,3,2] => 1
[[1,3],[2],[4]] => [4,2,1,3] => [2,4,1,3] => [3,1,2,4] => 3
[[1,2],[3],[4]] => [4,3,1,2] => [1,4,3,2] => [3,4,2,1] => 3
[[1],[2],[3],[4]] => [4,3,2,1] => [4,3,2,1] => [4,3,1,2] => 4
[[1,2,3,4,5]] => [1,2,3,4,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
[[1,3,4,5],[2]] => [2,1,3,4,5] => [2,1,3,4,5] => [1,3,2,4,5] => 1
[[1,2,4,5],[3]] => [3,1,2,4,5] => [1,3,2,4,5] => [1,2,4,3,5] => 1
[[1,2,3,5],[4]] => [4,1,2,3,5] => [1,2,4,3,5] => [1,2,3,5,4] => 1
[[1,2,3,4],[5]] => [5,1,2,3,4] => [1,2,3,5,4] => [2,3,4,5,1] => 2
[[1,3,5],[2,4]] => [2,4,1,3,5] => [2,1,4,3,5] => [1,3,2,5,4] => 1
[[1,2,5],[3,4]] => [3,4,1,2,5] => [1,3,4,2,5] => [1,2,5,3,4] => 1
[[1,3,4],[2,5]] => [2,5,1,3,4] => [2,1,3,5,4] => [2,4,3,5,1] => 2
[[1,2,4],[3,5]] => [3,5,1,2,4] => [1,3,2,5,4] => [2,3,5,4,1] => 2
[[1,2,3],[4,5]] => [4,5,1,2,3] => [1,2,4,5,3] => [2,3,4,1,5] => 2
[[1,4,5],[2],[3]] => [3,2,1,4,5] => [3,2,1,4,5] => [1,4,3,2,5] => 1
[[1,3,5],[2],[4]] => [4,2,1,3,5] => [2,4,1,3,5] => [1,4,2,5,3] => 1
[[1,2,5],[3],[4]] => [4,3,1,2,5] => [1,4,3,2,5] => [1,2,5,4,3] => 1
[[1,3,4],[2],[5]] => [5,2,1,3,4] => [2,1,5,3,4] => [3,5,4,1,2] => 3
[[1,2,4],[3],[5]] => [5,3,1,2,4] => [1,3,5,2,4] => [3,4,1,2,5] => 3
[[1,2,3],[4],[5]] => [5,4,1,2,3] => [1,2,5,4,3] => [3,4,5,2,1] => 3
[[1,4],[2,5],[3]] => [3,2,5,1,4] => [3,2,1,5,4] => [2,5,4,3,1] => 2
[[1,3],[2,5],[4]] => [4,2,5,1,3] => [2,4,1,5,3] => [2,5,3,1,4] => 2
[[1,2],[3,5],[4]] => [4,3,5,1,2] => [1,4,3,5,2] => [2,3,1,4,5] => 2
[[1,3],[2,4],[5]] => [5,2,4,1,3] => [2,1,5,4,3] => [3,5,4,2,1] => 3
[[1,2],[3,4],[5]] => [5,3,4,1,2] => [1,3,5,4,2] => [3,4,2,1,5] => 3
[[1,5],[2],[3],[4]] => [4,3,2,1,5] => [4,3,2,1,5] => [1,5,4,3,2] => 1
[[1,4],[2],[3],[5]] => [5,3,2,1,4] => [3,5,2,1,4] => [4,2,3,1,5] => 4
[[1,3],[2],[4],[5]] => [5,4,2,1,3] => [2,5,4,1,3] => [4,2,1,3,5] => 4
[[1,2],[3],[4],[5]] => [5,4,3,1,2] => [1,5,4,3,2] => [4,5,3,1,2] => 4
[[1],[2],[3],[4],[5]] => [5,4,3,2,1] => [5,4,3,2,1] => [5,4,1,2,3] => 5
[[1,2,3,4,5,6]] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
[[1,3,4,5,6],[2]] => [2,1,3,4,5,6] => [2,1,3,4,5,6] => [1,3,2,4,5,6] => 1
[[1,2,4,5,6],[3]] => [3,1,2,4,5,6] => [1,3,2,4,5,6] => [1,2,4,3,5,6] => 1
[[1,2,3,5,6],[4]] => [4,1,2,3,5,6] => [1,2,4,3,5,6] => [1,2,3,5,4,6] => 1
[[1,2,3,4,6],[5]] => [5,1,2,3,4,6] => [1,2,3,5,4,6] => [1,2,3,4,6,5] => 1
[[1,2,3,4,5],[6]] => [6,1,2,3,4,5] => [1,2,3,4,6,5] => [2,3,4,5,6,1] => 2
[[1,3,5,6],[2,4]] => [2,4,1,3,5,6] => [2,1,4,3,5,6] => [1,3,2,5,4,6] => 1
[[1,2,5,6],[3,4]] => [3,4,1,2,5,6] => [1,3,4,2,5,6] => [1,2,5,3,4,6] => 1
[[1,3,4,6],[2,5]] => [2,5,1,3,4,6] => [2,1,3,5,4,6] => [1,3,2,4,6,5] => 1
[[1,2,4,6],[3,5]] => [3,5,1,2,4,6] => [1,3,2,5,4,6] => [1,2,4,3,6,5] => 1
[[1,2,3,6],[4,5]] => [4,5,1,2,3,6] => [1,2,4,5,3,6] => [1,2,3,6,4,5] => 1
[[1,3,4,5],[2,6]] => [2,6,1,3,4,5] => [2,1,3,4,6,5] => [2,4,3,5,6,1] => 2
[[1,2,4,5],[3,6]] => [3,6,1,2,4,5] => [1,3,2,4,6,5] => [2,3,5,4,6,1] => 2
[[1,2,3,5],[4,6]] => [4,6,1,2,3,5] => [1,2,4,3,6,5] => [2,3,4,6,5,1] => 2
[[1,2,3,4],[5,6]] => [5,6,1,2,3,4] => [1,2,3,5,6,4] => [2,3,4,5,1,6] => 2
[[1,4,5,6],[2],[3]] => [3,2,1,4,5,6] => [3,2,1,4,5,6] => [1,4,3,2,5,6] => 1
[[1,3,5,6],[2],[4]] => [4,2,1,3,5,6] => [2,4,1,3,5,6] => [1,4,2,5,3,6] => 1
[[1,2,5,6],[3],[4]] => [4,3,1,2,5,6] => [1,4,3,2,5,6] => [1,2,5,4,3,6] => 1
[[1,3,4,6],[2],[5]] => [5,2,1,3,4,6] => [2,1,5,3,4,6] => [1,3,2,5,6,4] => 1
[[1,2,4,6],[3],[5]] => [5,3,1,2,4,6] => [1,3,5,2,4,6] => [1,2,5,3,6,4] => 1
[[1,2,3,6],[4],[5]] => [5,4,1,2,3,6] => [1,2,5,4,3,6] => [1,2,3,6,5,4] => 1
[[1,3,4,5],[2],[6]] => [6,2,1,3,4,5] => [2,1,3,6,4,5] => [3,5,4,6,1,2] => 3
[[1,2,4,5],[3],[6]] => [6,3,1,2,4,5] => [1,3,2,6,4,5] => [3,4,6,5,1,2] => 3
[[1,2,3,5],[4],[6]] => [6,4,1,2,3,5] => [1,2,4,6,3,5] => [3,4,5,1,2,6] => 3
[[1,2,3,4],[5],[6]] => [6,5,1,2,3,4] => [1,2,3,6,5,4] => [3,4,5,6,2,1] => 3
[[1,3,5],[2,4,6]] => [2,4,6,1,3,5] => [2,1,4,3,6,5] => [2,4,3,6,5,1] => 2
[[1,2,5],[3,4,6]] => [3,4,6,1,2,5] => [1,3,4,2,6,5] => [2,3,6,4,5,1] => 2
[[1,3,4],[2,5,6]] => [2,5,6,1,3,4] => [2,1,3,5,6,4] => [2,4,3,5,1,6] => 2
[[1,2,4],[3,5,6]] => [3,5,6,1,2,4] => [1,3,2,5,6,4] => [2,3,5,4,1,6] => 2
[[1,2,3],[4,5,6]] => [4,5,6,1,2,3] => [1,2,4,5,6,3] => [2,3,4,1,6,5] => 2
[[1,4,6],[2,5],[3]] => [3,2,5,1,4,6] => [3,2,1,5,4,6] => [1,4,3,2,6,5] => 1
[[1,3,6],[2,5],[4]] => [4,2,5,1,3,6] => [2,4,1,5,3,6] => [1,4,2,6,3,5] => 1
[[1,2,6],[3,5],[4]] => [4,3,5,1,2,6] => [1,4,3,5,2,6] => [1,2,6,4,3,5] => 1
[[1,3,6],[2,4],[5]] => [5,2,4,1,3,6] => [2,1,5,4,3,6] => [1,3,2,6,5,4] => 1
[[1,2,6],[3,4],[5]] => [5,3,4,1,2,6] => [1,3,5,4,2,6] => [1,2,6,3,5,4] => 1
[[1,4,5],[2,6],[3]] => [3,2,6,1,4,5] => [3,2,1,4,6,5] => [2,5,4,3,6,1] => 2
[[1,3,5],[2,6],[4]] => [4,2,6,1,3,5] => [2,4,1,3,6,5] => [2,5,3,6,4,1] => 2
[[1,2,5],[3,6],[4]] => [4,3,6,1,2,5] => [1,4,3,2,6,5] => [2,3,6,5,4,1] => 2
[[1,3,4],[2,6],[5]] => [5,2,6,1,3,4] => [2,1,5,3,6,4] => [2,4,3,6,1,5] => 2
[[1,2,4],[3,6],[5]] => [5,3,6,1,2,4] => [1,3,5,2,6,4] => [2,3,6,4,1,5] => 2
[[1,2,3],[4,6],[5]] => [5,4,6,1,2,3] => [1,2,5,4,6,3] => [2,3,4,1,5,6] => 2
[[1,3,5],[2,4],[6]] => [6,2,4,1,3,5] => [2,1,4,6,3,5] => [3,5,4,1,2,6] => 3
[[1,2,5],[3,4],[6]] => [6,3,4,1,2,5] => [1,3,4,6,2,5] => [3,4,1,2,5,6] => 3
[[1,3,4],[2,5],[6]] => [6,2,5,1,3,4] => [2,1,3,6,5,4] => [3,5,4,6,2,1] => 3
[[1,2,4],[3,5],[6]] => [6,3,5,1,2,4] => [1,3,2,6,5,4] => [3,4,6,5,2,1] => 3
[[1,2,3],[4,5],[6]] => [6,4,5,1,2,3] => [1,2,4,6,5,3] => [3,4,5,2,1,6] => 3
[[1,5,6],[2],[3],[4]] => [4,3,2,1,5,6] => [4,3,2,1,5,6] => [1,5,4,3,2,6] => 1
[[1,4,6],[2],[3],[5]] => [5,3,2,1,4,6] => [3,5,2,1,4,6] => [1,5,4,2,6,3] => 1
[[1,3,6],[2],[4],[5]] => [5,4,2,1,3,6] => [2,5,4,1,3,6] => [1,5,2,6,4,3] => 1
[[1,2,6],[3],[4],[5]] => [5,4,3,1,2,6] => [1,5,4,3,2,6] => [1,2,6,5,4,3] => 1
[[1,4,5],[2],[3],[6]] => [6,3,2,1,4,5] => [3,2,6,1,4,5] => [4,1,3,6,5,2] => 4
[[1,3,5],[2],[4],[6]] => [6,4,2,1,3,5] => [2,4,6,1,3,5] => [4,1,3,5,2,6] => 4
[[1,2,5],[3],[4],[6]] => [6,4,3,1,2,5] => [1,4,6,3,2,5] => [4,5,2,3,1,6] => 4
[[1,3,4],[2],[5],[6]] => [6,5,2,1,3,4] => [2,1,6,5,3,4] => [4,6,5,2,1,3] => 4
[[1,2,4],[3],[5],[6]] => [6,5,3,1,2,4] => [1,3,6,5,2,4] => [4,5,2,1,3,6] => 4
[[1,2,3],[4],[5],[6]] => [6,5,4,1,2,3] => [1,2,6,5,4,3] => [4,5,6,3,1,2] => 4
[[1,4],[2,5],[3,6]] => [3,6,2,5,1,4] => [3,2,1,6,5,4] => [3,6,5,4,2,1] => 3
[[1,3],[2,5],[4,6]] => [4,6,2,5,1,3] => [2,4,1,6,5,3] => [3,6,4,2,1,5] => 3
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Description
The first entry of the permutation.
This can be described as 1 plus the number of occurrences of the vincular pattern ([2,1], {(0,0),(0,1),(0,2)}), i.e., the first column is shaded, see [1].
This statistic is related to the number of deficiencies St000703The number of deficiencies of a permutation. as follows: consider the arc diagram of a permutation $\pi$ of $n$, together with its rotations, obtained by conjugating with the long cycle $(1,\dots,n)$. Drawing the labels $1$ to $n$ in this order on a circle, and the arcs $(i, \pi(i))$ as straight lines, the rotation of $\pi$ is obtained by replacing each number $i$ by $(i\bmod n) +1$. Then, $\pi(1)-1$ is the number of rotations of $\pi$ where the arc $(1, \pi(1))$ is a deficiency. In particular, if $O(\pi)$ is the orbit of rotations of $\pi$, then the number of deficiencies of $\pi$ equals
$$ \frac{1}{|O(\pi)|}\sum_{\sigma\in O(\pi)} (\sigma(1)-1). $$
This can be described as 1 plus the number of occurrences of the vincular pattern ([2,1], {(0,0),(0,1),(0,2)}), i.e., the first column is shaded, see [1].
This statistic is related to the number of deficiencies St000703The number of deficiencies of a permutation. as follows: consider the arc diagram of a permutation $\pi$ of $n$, together with its rotations, obtained by conjugating with the long cycle $(1,\dots,n)$. Drawing the labels $1$ to $n$ in this order on a circle, and the arcs $(i, \pi(i))$ as straight lines, the rotation of $\pi$ is obtained by replacing each number $i$ by $(i\bmod n) +1$. Then, $\pi(1)-1$ is the number of rotations of $\pi$ where the arc $(1, \pi(1))$ is a deficiency. In particular, if $O(\pi)$ is the orbit of rotations of $\pi$, then the number of deficiencies of $\pi$ equals
$$ \frac{1}{|O(\pi)|}\sum_{\sigma\in O(\pi)} (\sigma(1)-1). $$
Map
Foata bijection
Description
Sends a permutation to its image under the Foata bijection.
The Foata bijection $\phi$ is a bijection on the set of words with no two equal letters. It can be defined by induction on the size of the word:
Given a word $w_1 w_2 ... w_n$, compute the image inductively by starting with $\phi(w_1) = w_1$.
At the $i$-th step, if $\phi(w_1 w_2 ... w_i) = v_1 v_2 ... v_i$, define $\phi(w_1 w_2 ... w_i w_{i+1})$ by placing $w_{i+1}$ on the end of the word $v_1 v_2 ... v_i$ and breaking the word up into blocks as follows.
To compute $\phi([1,4,2,5,3])$, the sequence of words is
This bijection sends the major index (St000004The major index of a permutation.) to the number of inversions (St000018The number of inversions of a permutation.).
The Foata bijection $\phi$ is a bijection on the set of words with no two equal letters. It can be defined by induction on the size of the word:
Given a word $w_1 w_2 ... w_n$, compute the image inductively by starting with $\phi(w_1) = w_1$.
At the $i$-th step, if $\phi(w_1 w_2 ... w_i) = v_1 v_2 ... v_i$, define $\phi(w_1 w_2 ... w_i w_{i+1})$ by placing $w_{i+1}$ on the end of the word $v_1 v_2 ... v_i$ and breaking the word up into blocks as follows.
- If $w_{i+1} \geq v_i$, place a vertical line to the right of each $v_k$ for which $w_{i+1} \geq v_k$.
- If $w_{i+1} < v_i$, place a vertical line to the right of each $v_k$ for which $w_{i+1} < v_k$.
To compute $\phi([1,4,2,5,3])$, the sequence of words is
- $1$
- $|1|4 \to 14$
- $|14|2 \to 412$
- $|4|1|2|5 \to 4125$
- $|4|125|3 \to 45123.$
This bijection sends the major index (St000004The major index of a permutation.) to the number of inversions (St000018The number of inversions of a permutation.).
Map
reading word permutation
Description
Return the permutation obtained by reading the entries of the tableau row by row, starting with the bottom-most row in English notation.
Map
ones to leading
Description
The unique permutation obtained by applying the Foata-Riordan map to obtain a Prüfer code, then prepending zero and cyclically shifting.
Let $c_1,\dots, c_{n-1}$ be the Prüfer code obtained via the Foata-Riordan map described in [1, eq (1.2)] and let $c_0 = 0$.
This map returns the a unique permutation $q_1,\dots, q_n$ such that $q_i - c_{i-1}$ is constant modulo $n+1$.
This map is Mp00299ones to leading restricted to permutations.
Let $c_1,\dots, c_{n-1}$ be the Prüfer code obtained via the Foata-Riordan map described in [1, eq (1.2)] and let $c_0 = 0$.
This map returns the a unique permutation $q_1,\dots, q_n$ such that $q_i - c_{i-1}$ is constant modulo $n+1$.
This map is Mp00299ones to leading restricted to permutations.
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