Identifier
-
Mp00080:
Set partitions
—to permutation⟶
Permutations
Mp00090: Permutations —cycle-as-one-line notation⟶ Permutations
Mp00062: Permutations —Lehmer-code to major-code bijection⟶ Permutations
St000470: Permutations ⟶ ℤ (values match St000021The number of descents of a permutation., St000325The width of the tree associated to a permutation.)
Values
{{1}} => [1] => [1] => [1] => 1
{{1,2}} => [2,1] => [1,2] => [1,2] => 1
{{1},{2}} => [1,2] => [1,2] => [1,2] => 1
{{1,2,3}} => [2,3,1] => [1,2,3] => [1,2,3] => 1
{{1,2},{3}} => [2,1,3] => [1,2,3] => [1,2,3] => 1
{{1,3},{2}} => [3,2,1] => [1,3,2] => [3,1,2] => 2
{{1},{2,3}} => [1,3,2] => [1,2,3] => [1,2,3] => 1
{{1},{2},{3}} => [1,2,3] => [1,2,3] => [1,2,3] => 1
{{1,2,3,4}} => [2,3,4,1] => [1,2,3,4] => [1,2,3,4] => 1
{{1,2,3},{4}} => [2,3,1,4] => [1,2,3,4] => [1,2,3,4] => 1
{{1,2,4},{3}} => [2,4,3,1] => [1,2,4,3] => [4,1,2,3] => 2
{{1,2},{3,4}} => [2,1,4,3] => [1,2,3,4] => [1,2,3,4] => 1
{{1,2},{3},{4}} => [2,1,3,4] => [1,2,3,4] => [1,2,3,4] => 1
{{1,3,4},{2}} => [3,2,4,1] => [1,3,4,2] => [2,4,1,3] => 2
{{1,3},{2,4}} => [3,4,1,2] => [1,3,2,4] => [3,1,2,4] => 2
{{1,3},{2},{4}} => [3,2,1,4] => [1,3,2,4] => [3,1,2,4] => 2
{{1,4},{2,3}} => [4,3,2,1] => [1,4,2,3] => [3,4,1,2] => 2
{{1},{2,3,4}} => [1,3,4,2] => [1,2,3,4] => [1,2,3,4] => 1
{{1},{2,3},{4}} => [1,3,2,4] => [1,2,3,4] => [1,2,3,4] => 1
{{1,4},{2},{3}} => [4,2,3,1] => [1,4,2,3] => [3,4,1,2] => 2
{{1},{2,4},{3}} => [1,4,3,2] => [1,2,4,3] => [4,1,2,3] => 2
{{1},{2},{3,4}} => [1,2,4,3] => [1,2,3,4] => [1,2,3,4] => 1
{{1},{2},{3},{4}} => [1,2,3,4] => [1,2,3,4] => [1,2,3,4] => 1
{{1,2,3,4,5}} => [2,3,4,5,1] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2,3,4},{5}} => [2,3,4,1,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2,3,5},{4}} => [2,3,5,4,1] => [1,2,3,5,4] => [5,1,2,3,4] => 2
{{1,2,3},{4,5}} => [2,3,1,5,4] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2,3},{4},{5}} => [2,3,1,4,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2,4,5},{3}} => [2,4,3,5,1] => [1,2,4,5,3] => [3,5,1,2,4] => 2
{{1,2,4},{3,5}} => [2,4,5,1,3] => [1,2,4,3,5] => [4,1,2,3,5] => 2
{{1,2,4},{3},{5}} => [2,4,3,1,5] => [1,2,4,3,5] => [4,1,2,3,5] => 2
{{1,2,5},{3,4}} => [2,5,4,3,1] => [1,2,5,3,4] => [4,5,1,2,3] => 2
{{1,2},{3,4,5}} => [2,1,4,5,3] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2},{3,4},{5}} => [2,1,4,3,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2,5},{3},{4}} => [2,5,3,4,1] => [1,2,5,3,4] => [4,5,1,2,3] => 2
{{1,2},{3,5},{4}} => [2,1,5,4,3] => [1,2,3,5,4] => [5,1,2,3,4] => 2
{{1,2},{3},{4,5}} => [2,1,3,5,4] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2},{3},{4},{5}} => [2,1,3,4,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,3,4,5},{2}} => [3,2,4,5,1] => [1,3,4,5,2] => [2,3,5,1,4] => 2
{{1,3,4},{2,5}} => [3,5,4,1,2] => [1,3,4,2,5] => [2,4,1,3,5] => 2
{{1,3,4},{2},{5}} => [3,2,4,1,5] => [1,3,4,2,5] => [2,4,1,3,5] => 2
{{1,3,5},{2,4}} => [3,4,5,2,1] => [1,3,5,2,4] => [2,4,5,1,3] => 2
{{1,3},{2,4,5}} => [3,4,1,5,2] => [1,3,2,4,5] => [3,1,2,4,5] => 2
{{1,3},{2,4},{5}} => [3,4,1,2,5] => [1,3,2,4,5] => [3,1,2,4,5] => 2
{{1,3,5},{2},{4}} => [3,2,5,4,1] => [1,3,5,2,4] => [2,4,5,1,3] => 2
{{1,3},{2,5},{4}} => [3,5,1,4,2] => [1,3,2,5,4] => [2,5,1,3,4] => 2
{{1,3},{2},{4,5}} => [3,2,1,5,4] => [1,3,2,4,5] => [3,1,2,4,5] => 2
{{1,3},{2},{4},{5}} => [3,2,1,4,5] => [1,3,2,4,5] => [3,1,2,4,5] => 2
{{1,4,5},{2,3}} => [4,3,2,5,1] => [1,4,5,2,3] => [4,2,5,1,3] => 3
{{1,4},{2,3,5}} => [4,3,5,1,2] => [1,4,2,3,5] => [3,4,1,2,5] => 2
{{1,4},{2,3},{5}} => [4,3,2,1,5] => [1,4,2,3,5] => [3,4,1,2,5] => 2
{{1,5},{2,3,4}} => [5,3,4,2,1] => [1,5,2,3,4] => [3,4,5,1,2] => 2
{{1},{2,3,4,5}} => [1,3,4,5,2] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1},{2,3,4},{5}} => [1,3,4,2,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,5},{2,3},{4}} => [5,3,2,4,1] => [1,5,2,3,4] => [3,4,5,1,2] => 2
{{1},{2,3,5},{4}} => [1,3,5,4,2] => [1,2,3,5,4] => [5,1,2,3,4] => 2
{{1},{2,3},{4,5}} => [1,3,2,5,4] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1},{2,3},{4},{5}} => [1,3,2,4,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,4,5},{2},{3}} => [4,2,3,5,1] => [1,4,5,2,3] => [4,2,5,1,3] => 3
{{1,4},{2,5},{3}} => [4,5,3,1,2] => [1,4,2,5,3] => [5,3,1,2,4] => 3
{{1,4},{2},{3,5}} => [4,2,5,1,3] => [1,4,2,3,5] => [3,4,1,2,5] => 2
{{1,4},{2},{3},{5}} => [4,2,3,1,5] => [1,4,2,3,5] => [3,4,1,2,5] => 2
{{1,5},{2,4},{3}} => [5,4,3,2,1] => [1,5,2,4,3] => [5,3,4,1,2] => 3
{{1},{2,4,5},{3}} => [1,4,3,5,2] => [1,2,4,5,3] => [3,5,1,2,4] => 2
{{1},{2,4},{3,5}} => [1,4,5,2,3] => [1,2,4,3,5] => [4,1,2,3,5] => 2
{{1},{2,4},{3},{5}} => [1,4,3,2,5] => [1,2,4,3,5] => [4,1,2,3,5] => 2
{{1,5},{2},{3,4}} => [5,2,4,3,1] => [1,5,2,3,4] => [3,4,5,1,2] => 2
{{1},{2,5},{3,4}} => [1,5,4,3,2] => [1,2,5,3,4] => [4,5,1,2,3] => 2
{{1},{2},{3,4,5}} => [1,2,4,5,3] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1},{2},{3,4},{5}} => [1,2,4,3,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,5},{2},{3},{4}} => [5,2,3,4,1] => [1,5,2,3,4] => [3,4,5,1,2] => 2
{{1},{2,5},{3},{4}} => [1,5,3,4,2] => [1,2,5,3,4] => [4,5,1,2,3] => 2
{{1},{2},{3,5},{4}} => [1,2,5,4,3] => [1,2,3,5,4] => [5,1,2,3,4] => 2
{{1},{2},{3},{4,5}} => [1,2,3,5,4] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1},{2},{3},{4},{5}} => [1,2,3,4,5] => [1,2,3,4,5] => [1,2,3,4,5] => 1
{{1,2,3,4,5,6}} => [2,3,4,5,6,1] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3,4,5},{6}} => [2,3,4,5,1,6] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3,4,6},{5}} => [2,3,4,6,5,1] => [1,2,3,4,6,5] => [6,1,2,3,4,5] => 2
{{1,2,3,4},{5,6}} => [2,3,4,1,6,5] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3,4},{5},{6}} => [2,3,4,1,5,6] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3,5,6},{4}} => [2,3,5,4,6,1] => [1,2,3,5,6,4] => [4,6,1,2,3,5] => 2
{{1,2,3,5},{4,6}} => [2,3,5,6,1,4] => [1,2,3,5,4,6] => [5,1,2,3,4,6] => 2
{{1,2,3,5},{4},{6}} => [2,3,5,4,1,6] => [1,2,3,5,4,6] => [5,1,2,3,4,6] => 2
{{1,2,3,6},{4,5}} => [2,3,6,5,4,1] => [1,2,3,6,4,5] => [5,6,1,2,3,4] => 2
{{1,2,3},{4,5,6}} => [2,3,1,5,6,4] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3},{4,5},{6}} => [2,3,1,5,4,6] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3,6},{4},{5}} => [2,3,6,4,5,1] => [1,2,3,6,4,5] => [5,6,1,2,3,4] => 2
{{1,2,3},{4,6},{5}} => [2,3,1,6,5,4] => [1,2,3,4,6,5] => [6,1,2,3,4,5] => 2
{{1,2,3},{4},{5,6}} => [2,3,1,4,6,5] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,3},{4},{5},{6}} => [2,3,1,4,5,6] => [1,2,3,4,5,6] => [1,2,3,4,5,6] => 1
{{1,2,4,5,6},{3}} => [2,4,3,5,6,1] => [1,2,4,5,6,3] => [3,4,6,1,2,5] => 2
{{1,2,4,5},{3,6}} => [2,4,6,5,1,3] => [1,2,4,5,3,6] => [3,5,1,2,4,6] => 2
{{1,2,4,5},{3},{6}} => [2,4,3,5,1,6] => [1,2,4,5,3,6] => [3,5,1,2,4,6] => 2
{{1,2,4,6},{3,5}} => [2,4,5,6,3,1] => [1,2,4,6,3,5] => [3,5,6,1,2,4] => 2
{{1,2,4},{3,5,6}} => [2,4,5,1,6,3] => [1,2,4,3,5,6] => [4,1,2,3,5,6] => 2
{{1,2,4},{3,5},{6}} => [2,4,5,1,3,6] => [1,2,4,3,5,6] => [4,1,2,3,5,6] => 2
{{1,2,4,6},{3},{5}} => [2,4,3,6,5,1] => [1,2,4,6,3,5] => [3,5,6,1,2,4] => 2
{{1,2,4},{3,6},{5}} => [2,4,6,1,5,3] => [1,2,4,3,6,5] => [3,6,1,2,4,5] => 2
{{1,2,4},{3},{5,6}} => [2,4,3,1,6,5] => [1,2,4,3,5,6] => [4,1,2,3,5,6] => 2
{{1,2,4},{3},{5},{6}} => [2,4,3,1,5,6] => [1,2,4,3,5,6] => [4,1,2,3,5,6] => 2
{{1,2,5,6},{3,4}} => [2,5,4,3,6,1] => [1,2,5,6,3,4] => [5,3,6,1,2,4] => 3
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Description
The number of runs in a permutation.
A run in a permutation is an inclusion-wise maximal increasing substring, i.e., a contiguous subsequence.
This is the same as the number of descents plus 1.
A run in a permutation is an inclusion-wise maximal increasing substring, i.e., a contiguous subsequence.
This is the same as the number of descents plus 1.
Map
to permutation
Description
Sends the set partition to the permutation obtained by considering the blocks as increasing cycles.
Map
cycle-as-one-line notation
Description
Return the permutation obtained by concatenating the cycles of a permutation, each written with minimal element first, sorted by minimal element.
Map
Lehmer-code to major-code bijection
Description
Sends a permutation to the unique permutation such that the Lehmer code is sent to the major code.
The Lehmer code encodes the inversions of a permutation and the major code encodes its major index. In particular, the number of inversions of a permutation equals the major index of its image under this map.
* The Lehmer code of a permutation $\sigma$ is given by $L(\sigma) = l_1 \ldots l_n$ with $l_i = \# \{ j > i : \sigma_j < \sigma_i \}$. In particular, $l_i$ is the number of boxes in the $i$-th column of the Rothe diagram. For example, the Lehmer code of $\sigma = [4,3,1,5,2]$ is $32010$. The Lehmer code $L : \mathfrak{S}_n\ \tilde\longrightarrow\ S_n$ is a bijection between permutations of size $n$ and sequences $l_1\ldots l_n \in \mathbf{N}^n$ with $l_i \leq i$.
* The major code $M(\sigma)$ of a permutation $\sigma \in \mathfrak{S}_n$ is a way to encode a permutation as a sequence $m_1 m_2 \ldots m_n$ with $m_i \geq i$. To define $m_i$, let $\operatorname{del}_i(\sigma)$ be the normalized permutation obtained by removing all $\sigma_j < i$ from the one-line notation of $\sigma$. The $i$-th index is then given by
$$m_i = \operatorname{maj}(\operatorname{del}_i(\sigma)) - \operatorname{maj}(\operatorname{del}_{i-1}(\sigma)).$$
For example, the permutation $[9,3,5,7,2,1,4,6,8]$ has major code $[5, 0, 1, 0, 1, 2, 0, 1, 0]$ since
$$\operatorname{maj}([8,2,4,6,1,3,5,7]) = 5, \quad \operatorname{maj}([7,1,3,5,2,4,6]) = 5, \quad \operatorname{maj}([6,2,4,1,3,5]) = 4,$$
$$\operatorname{maj}([5,1,3,2,4]) = 4, \quad \operatorname{maj}([4,2,1,3]) = 3, \quad \operatorname{maj}([3,1,2]) = 1, \quad \operatorname{maj}([2,1]) = 1.$$
Observe that the sum of the major code of $\sigma$ equals the major index of $\sigma$.
The Lehmer code encodes the inversions of a permutation and the major code encodes its major index. In particular, the number of inversions of a permutation equals the major index of its image under this map.
* The Lehmer code of a permutation $\sigma$ is given by $L(\sigma) = l_1 \ldots l_n$ with $l_i = \# \{ j > i : \sigma_j < \sigma_i \}$. In particular, $l_i$ is the number of boxes in the $i$-th column of the Rothe diagram. For example, the Lehmer code of $\sigma = [4,3,1,5,2]$ is $32010$. The Lehmer code $L : \mathfrak{S}_n\ \tilde\longrightarrow\ S_n$ is a bijection between permutations of size $n$ and sequences $l_1\ldots l_n \in \mathbf{N}^n$ with $l_i \leq i$.
* The major code $M(\sigma)$ of a permutation $\sigma \in \mathfrak{S}_n$ is a way to encode a permutation as a sequence $m_1 m_2 \ldots m_n$ with $m_i \geq i$. To define $m_i$, let $\operatorname{del}_i(\sigma)$ be the normalized permutation obtained by removing all $\sigma_j < i$ from the one-line notation of $\sigma$. The $i$-th index is then given by
$$m_i = \operatorname{maj}(\operatorname{del}_i(\sigma)) - \operatorname{maj}(\operatorname{del}_{i-1}(\sigma)).$$
For example, the permutation $[9,3,5,7,2,1,4,6,8]$ has major code $[5, 0, 1, 0, 1, 2, 0, 1, 0]$ since
$$\operatorname{maj}([8,2,4,6,1,3,5,7]) = 5, \quad \operatorname{maj}([7,1,3,5,2,4,6]) = 5, \quad \operatorname{maj}([6,2,4,1,3,5]) = 4,$$
$$\operatorname{maj}([5,1,3,2,4]) = 4, \quad \operatorname{maj}([4,2,1,3]) = 3, \quad \operatorname{maj}([3,1,2]) = 1, \quad \operatorname{maj}([2,1]) = 1.$$
Observe that the sum of the major code of $\sigma$ equals the major index of $\sigma$.
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