Identifier
Mp00283:
Perfect matchings
—non-nesting-exceedence permutation⟶
Permutations
Mp00175: Permutations —inverse Foata bijection⟶ Permutations
Mp00068: Permutations —Simion-Schmidt map⟶ Permutations
Mp00114: Permutations —connectivity set⟶ Binary words
Mp00175: Permutations —inverse Foata bijection⟶ Permutations
Mp00068: Permutations —Simion-Schmidt map⟶ Permutations
Mp00114: Permutations —connectivity set⟶ Binary words
Images
[(1,2)] => [2,1] => [2,1] => [2,1] => 0
[(1,2),(3,4)] => [2,1,4,3] => [2,4,1,3] => [2,4,1,3] => 000
[(1,3),(2,4)] => [3,4,1,2] => [3,1,4,2] => [3,1,4,2] => 000
[(1,4),(2,3)] => [3,4,2,1] => [3,4,2,1] => [3,4,2,1] => 000
[(1,2),(3,4),(5,6)] => [2,1,4,3,6,5] => [2,4,6,1,3,5] => [2,6,5,1,4,3] => 00000
[(1,3),(2,4),(5,6)] => [3,4,1,2,6,5] => [3,1,4,6,2,5] => [3,1,6,5,4,2] => 00000
[(1,4),(2,3),(5,6)] => [3,4,2,1,6,5] => [3,4,2,6,1,5] => [3,6,2,5,1,4] => 00000
[(1,5),(2,3),(4,6)] => [3,5,2,6,1,4] => [5,3,6,2,1,4] => [5,3,6,2,1,4] => 00000
[(1,6),(2,3),(4,5)] => [3,5,2,6,4,1] => [5,3,6,2,4,1] => [5,3,6,2,4,1] => 00000
[(1,6),(2,4),(3,5)] => [4,5,6,2,3,1] => [4,5,2,6,3,1] => [4,6,2,5,3,1] => 00000
[(1,5),(2,4),(3,6)] => [4,5,6,2,1,3] => [4,5,2,1,6,3] => [4,6,2,1,5,3] => 00000
[(1,4),(2,5),(3,6)] => [4,5,6,1,2,3] => [4,1,5,2,6,3] => [4,1,6,5,3,2] => 00000
[(1,3),(2,5),(4,6)] => [3,5,1,6,2,4] => [5,3,1,6,2,4] => [5,3,1,6,4,2] => 00000
[(1,2),(3,5),(4,6)] => [2,1,5,6,3,4] => [5,6,2,1,3,4] => [5,6,2,1,4,3] => 00000
[(1,2),(3,6),(4,5)] => [2,1,5,6,4,3] => [5,6,2,4,1,3] => [5,6,2,4,1,3] => 00000
[(1,3),(2,6),(4,5)] => [3,5,1,6,4,2] => [3,5,6,1,4,2] => [3,6,5,1,4,2] => 00000
[(1,4),(2,6),(3,5)] => [4,5,6,1,3,2] => [4,1,5,6,3,2] => [4,1,6,5,3,2] => 00000
[(1,5),(2,6),(3,4)] => [4,5,6,3,1,2] => [4,5,1,6,3,2] => [4,6,1,5,3,2] => 00000
[(1,6),(2,5),(3,4)] => [4,5,6,3,2,1] => [4,5,6,3,2,1] => [4,6,5,3,2,1] => 00000
[(1,2),(3,4),(5,6),(7,8)] => [2,1,4,3,6,5,8,7] => [2,4,6,8,1,3,5,7] => [2,8,7,6,1,5,4,3] => 0000000
[(1,3),(2,4),(5,6),(7,8)] => [3,4,1,2,6,5,8,7] => [3,1,4,6,8,2,5,7] => [3,1,8,7,6,5,4,2] => 0000000
[(1,4),(2,3),(5,6),(7,8)] => [3,4,2,1,6,5,8,7] => [3,4,2,6,8,1,5,7] => [3,8,2,7,6,1,5,4] => 0000000
[(1,5),(2,3),(4,6),(7,8)] => [3,5,2,6,1,4,8,7] => [5,3,6,2,8,1,4,7] => [5,3,8,2,7,1,6,4] => 0000000
[(1,6),(2,3),(4,5),(7,8)] => [3,5,2,6,4,1,8,7] => [5,3,6,2,4,8,1,7] => [5,3,8,2,7,6,1,4] => 0000000
[(1,7),(2,3),(4,5),(6,8)] => [3,5,2,7,4,8,1,6] => [5,7,3,8,2,4,1,6] => [5,8,3,7,2,6,1,4] => 0000000
[(1,8),(2,3),(4,5),(6,7)] => [3,5,2,7,4,8,6,1] => [5,7,3,8,2,4,6,1] => [5,8,3,7,2,6,4,1] => 0000000
[(1,8),(2,4),(3,5),(6,7)] => [4,5,7,2,3,8,6,1] => [7,4,2,5,8,3,6,1] => [7,4,2,8,6,5,3,1] => 0000000
[(1,7),(2,4),(3,5),(6,8)] => [4,5,7,2,3,8,1,6] => [7,4,2,5,8,3,1,6] => [7,4,2,8,6,5,1,3] => 0000000
[(1,6),(2,4),(3,5),(7,8)] => [4,5,6,2,3,1,8,7] => [4,5,2,6,3,8,1,7] => [4,8,2,7,6,5,1,3] => 0000000
[(1,5),(2,4),(3,6),(7,8)] => [4,5,6,2,1,3,8,7] => [4,5,2,1,6,8,3,7] => [4,8,2,1,7,6,5,3] => 0000000
[(1,4),(2,5),(3,6),(7,8)] => [4,5,6,1,2,3,8,7] => [4,1,5,2,6,8,3,7] => [4,1,8,7,6,5,3,2] => 0000000
[(1,3),(2,5),(4,6),(7,8)] => [3,5,1,6,2,4,8,7] => [5,3,1,6,8,2,4,7] => [5,3,1,8,7,6,4,2] => 0000000
[(1,2),(3,5),(4,6),(7,8)] => [2,1,5,6,3,4,8,7] => [5,6,2,8,1,3,4,7] => [5,8,2,7,1,6,4,3] => 0000000
[(1,2),(3,6),(4,5),(7,8)] => [2,1,5,6,4,3,8,7] => [5,6,2,4,8,1,3,7] => [5,8,2,7,6,1,4,3] => 0000000
[(1,3),(2,6),(4,5),(7,8)] => [3,5,1,6,4,2,8,7] => [3,5,6,1,4,8,2,7] => [3,8,7,1,6,5,4,2] => 0000000
[(1,4),(2,6),(3,5),(7,8)] => [4,5,6,1,3,2,8,7] => [4,1,5,6,3,8,2,7] => [4,1,8,7,6,5,3,2] => 0000000
[(1,5),(2,6),(3,4),(7,8)] => [4,5,6,3,1,2,8,7] => [4,5,1,6,3,8,2,7] => [4,8,1,7,6,5,3,2] => 0000000
[(1,6),(2,5),(3,4),(7,8)] => [4,5,6,3,2,1,8,7] => [4,5,6,3,2,8,1,7] => [4,8,7,3,2,6,1,5] => 0000000
[(1,7),(2,5),(3,4),(6,8)] => [4,5,7,3,2,8,1,6] => [7,4,5,3,8,2,1,6] => [7,4,8,3,6,2,1,5] => 0000000
[(1,8),(2,5),(3,4),(6,7)] => [4,5,7,3,2,8,6,1] => [7,4,5,3,8,2,6,1] => [7,4,8,3,6,2,5,1] => 0000000
[(1,8),(2,6),(3,4),(5,7)] => [4,6,7,3,8,2,5,1] => [6,7,4,8,3,2,5,1] => [6,8,4,7,3,2,5,1] => 0000000
[(1,7),(2,6),(3,4),(5,8)] => [4,6,7,3,8,2,1,5] => [6,7,4,8,3,2,1,5] => [6,8,4,7,3,2,1,5] => 0000000
[(1,6),(2,7),(3,4),(5,8)] => [4,6,7,3,8,1,2,5] => [6,7,4,1,8,3,2,5] => [6,8,4,1,7,5,3,2] => 0000000
[(1,5),(2,7),(3,4),(6,8)] => [4,5,7,3,1,8,2,6] => [7,4,5,3,1,8,2,6] => [7,4,8,3,1,6,5,2] => 0000000
[(1,4),(2,7),(3,5),(6,8)] => [4,5,7,1,3,8,2,6] => [4,7,1,5,8,3,2,6] => [4,8,1,7,6,5,3,2] => 0000000
[(1,3),(2,7),(4,5),(6,8)] => [3,5,1,7,4,8,2,6] => [5,3,7,8,1,4,2,6] => [5,3,8,7,1,6,4,2] => 0000000
[(1,2),(3,7),(4,5),(6,8)] => [2,1,5,7,4,8,3,6] => [7,5,8,2,4,1,3,6] => [7,5,8,2,6,1,4,3] => 0000000
[(1,2),(3,8),(4,5),(6,7)] => [2,1,5,7,4,8,6,3] => [7,5,8,2,4,6,1,3] => [7,5,8,2,6,4,1,3] => 0000000
[(1,3),(2,8),(4,5),(6,7)] => [3,5,1,7,4,8,6,2] => [7,3,5,8,1,4,6,2] => [7,3,8,6,1,5,4,2] => 0000000
[(1,4),(2,8),(3,5),(6,7)] => [4,5,7,1,3,8,6,2] => [4,5,1,7,8,3,6,2] => [4,8,1,7,6,5,3,2] => 0000000
[(1,5),(2,8),(3,4),(6,7)] => [4,5,7,3,1,8,6,2] => [7,4,1,5,8,3,6,2] => [7,4,1,8,6,5,3,2] => 0000000
[(1,6),(2,8),(3,4),(5,7)] => [4,6,7,3,8,1,5,2] => [6,7,4,3,8,1,5,2] => [6,8,4,3,7,1,5,2] => 0000000
[(1,7),(2,8),(3,4),(5,6)] => [4,6,7,3,8,5,1,2] => [6,7,4,8,3,1,5,2] => [6,8,4,7,3,1,5,2] => 0000000
[(1,8),(2,7),(3,4),(5,6)] => [4,6,7,3,8,5,2,1] => [6,7,4,8,3,5,2,1] => [6,8,4,7,3,5,2,1] => 0000000
[(1,8),(2,7),(3,5),(4,6)] => [5,6,7,8,3,4,2,1] => [5,6,7,3,8,4,2,1] => [5,8,7,3,6,4,2,1] => 0000000
[(1,7),(2,8),(3,5),(4,6)] => [5,6,7,8,3,4,1,2] => [5,6,7,3,1,8,4,2] => [5,8,7,3,1,6,4,2] => 0000000
[(1,6),(2,8),(3,5),(4,7)] => [5,6,7,8,3,1,4,2] => [5,6,1,7,3,8,4,2] => [5,8,1,7,6,4,3,2] => 0000000
[(1,5),(2,8),(3,6),(4,7)] => [5,6,7,8,1,3,4,2] => [5,1,6,7,3,8,4,2] => [5,1,8,7,6,4,3,2] => 0000000
[(1,4),(2,8),(3,6),(5,7)] => [4,6,7,1,8,3,5,2] => [6,4,7,1,8,3,5,2] => [6,4,8,1,7,5,3,2] => 0000000
[(1,3),(2,8),(4,6),(5,7)] => [3,6,1,7,8,4,5,2] => [6,7,8,3,1,4,5,2] => [6,8,7,3,1,5,4,2] => 0000000
[(1,2),(3,8),(4,6),(5,7)] => [2,1,6,7,8,4,5,3] => [6,7,2,8,4,5,1,3] => [6,8,2,7,5,4,1,3] => 0000000
[(1,2),(3,7),(4,6),(5,8)] => [2,1,6,7,8,4,3,5] => [6,7,2,8,4,1,3,5] => [6,8,2,7,5,1,4,3] => 0000000
[(1,3),(2,7),(4,6),(5,8)] => [3,6,1,7,8,4,2,5] => [3,6,1,7,8,4,2,5] => [3,8,1,7,6,5,4,2] => 0000000
[(1,4),(2,7),(3,6),(5,8)] => [4,6,7,1,8,3,2,5] => [6,1,7,4,8,3,2,5] => [6,1,8,7,5,4,3,2] => 0000000
[(1,5),(2,7),(3,6),(4,8)] => [5,6,7,8,1,3,2,4] => [5,1,6,7,3,2,8,4] => [5,1,8,7,6,4,3,2] => 0000000
[(1,6),(2,7),(3,5),(4,8)] => [5,6,7,8,3,1,2,4] => [5,6,1,7,3,2,8,4] => [5,8,1,7,6,4,3,2] => 0000000
[(1,7),(2,6),(3,5),(4,8)] => [5,6,7,8,3,2,1,4] => [5,6,7,3,2,1,8,4] => [5,8,7,3,2,1,6,4] => 0000000
[(1,8),(2,6),(3,5),(4,7)] => [5,6,7,8,3,2,4,1] => [5,6,7,3,2,8,4,1] => [5,8,7,3,2,6,4,1] => 0000000
[(1,8),(2,5),(3,6),(4,7)] => [5,6,7,8,2,3,4,1] => [5,6,2,7,3,8,4,1] => [5,8,2,7,6,4,3,1] => 0000000
[(1,7),(2,5),(3,6),(4,8)] => [5,6,7,8,2,3,1,4] => [5,6,2,7,3,1,8,4] => [5,8,2,7,6,1,4,3] => 0000000
[(1,6),(2,5),(3,7),(4,8)] => [5,6,7,8,2,1,3,4] => [5,6,2,1,7,3,8,4] => [5,8,2,1,7,6,4,3] => 0000000
[(1,5),(2,6),(3,7),(4,8)] => [5,6,7,8,1,2,3,4] => [5,1,6,2,7,3,8,4] => [5,1,8,7,6,4,3,2] => 0000000
[(1,4),(2,6),(3,7),(5,8)] => [4,6,7,1,8,2,3,5] => [6,1,7,4,2,8,3,5] => [6,1,8,7,5,4,3,2] => 0000000
[(1,3),(2,6),(4,7),(5,8)] => [3,6,1,7,8,2,4,5] => [3,6,1,7,2,8,4,5] => [3,8,1,7,6,5,4,2] => 0000000
[(1,2),(3,6),(4,7),(5,8)] => [2,1,6,7,8,3,4,5] => [6,7,2,1,8,3,4,5] => [6,8,2,1,7,5,4,3] => 0000000
[(1,2),(3,5),(4,7),(6,8)] => [2,1,5,7,3,8,4,6] => [7,5,8,2,1,3,4,6] => [7,5,8,2,1,6,4,3] => 0000000
[(1,3),(2,5),(4,7),(6,8)] => [3,5,1,7,2,8,4,6] => [5,7,3,1,8,2,4,6] => [5,8,3,1,7,6,4,2] => 0000000
[(1,4),(2,5),(3,7),(6,8)] => [4,5,7,1,2,8,3,6] => [4,7,1,5,2,8,3,6] => [4,8,1,7,6,5,3,2] => 0000000
[(1,5),(2,4),(3,7),(6,8)] => [4,5,7,2,1,8,3,6] => [7,4,2,5,1,8,3,6] => [7,4,2,8,1,6,5,3] => 0000000
[(1,6),(2,4),(3,7),(5,8)] => [4,6,7,2,8,1,3,5] => [6,7,4,2,1,8,3,5] => [6,8,4,2,1,7,5,3] => 0000000
[(1,7),(2,4),(3,6),(5,8)] => [4,6,7,2,8,3,1,5] => [6,7,4,2,8,3,1,5] => [6,8,4,2,7,5,1,3] => 0000000
[(1,8),(2,4),(3,6),(5,7)] => [4,6,7,2,8,3,5,1] => [6,7,4,2,8,3,5,1] => [6,8,4,2,7,5,3,1] => 0000000
[(1,8),(2,3),(4,6),(5,7)] => [3,6,2,7,8,4,5,1] => [3,6,7,2,8,4,5,1] => [3,8,7,2,6,5,4,1] => 0000000
[(1,7),(2,3),(4,6),(5,8)] => [3,6,2,7,8,4,1,5] => [3,6,7,2,8,4,1,5] => [3,8,7,2,6,5,1,4] => 0000000
[(1,6),(2,3),(4,7),(5,8)] => [3,6,2,7,8,1,4,5] => [3,6,7,2,1,8,4,5] => [3,8,7,2,1,6,5,4] => 0000000
[(1,5),(2,3),(4,7),(6,8)] => [3,5,2,7,1,8,4,6] => [5,7,3,8,2,1,4,6] => [5,8,3,7,2,1,6,4] => 0000000
[(1,4),(2,3),(5,7),(6,8)] => [3,4,2,1,7,8,5,6] => [3,4,7,8,2,1,5,6] => [3,8,7,6,2,1,5,4] => 0000000
[(1,3),(2,4),(5,7),(6,8)] => [3,4,1,2,7,8,5,6] => [3,4,7,1,8,2,5,6] => [3,8,7,1,6,5,4,2] => 0000000
[(1,2),(3,4),(5,7),(6,8)] => [2,1,4,3,7,8,5,6] => [7,8,2,4,1,3,5,6] => [7,8,2,6,1,5,4,3] => 0000000
[(1,2),(3,4),(5,8),(6,7)] => [2,1,4,3,7,8,6,5] => [7,8,2,4,6,1,3,5] => [7,8,2,6,5,1,4,3] => 0000000
[(1,3),(2,4),(5,8),(6,7)] => [3,4,1,2,7,8,6,5] => [3,7,8,1,4,6,2,5] => [3,8,7,1,6,5,4,2] => 0000000
[(1,4),(2,3),(5,8),(6,7)] => [3,4,2,1,7,8,6,5] => [3,4,7,8,2,6,1,5] => [3,8,7,6,2,5,1,4] => 0000000
[(1,5),(2,3),(4,8),(6,7)] => [3,5,2,7,1,8,6,4] => [5,7,3,8,2,6,1,4] => [5,8,3,7,2,6,1,4] => 0000000
[(1,6),(2,3),(4,8),(5,7)] => [3,6,2,7,8,1,5,4] => [3,6,7,2,8,5,1,4] => [3,8,7,2,6,5,1,4] => 0000000
[(1,7),(2,3),(4,8),(5,6)] => [3,6,2,7,8,5,1,4] => [3,6,7,8,5,2,1,4] => [3,8,7,6,5,2,1,4] => 0000000
[(1,8),(2,3),(4,7),(5,6)] => [3,6,2,7,8,5,4,1] => [3,6,7,8,5,2,4,1] => [3,8,7,6,5,2,4,1] => 0000000
[(1,8),(2,4),(3,7),(5,6)] => [4,6,7,2,8,5,3,1] => [6,4,7,8,2,5,3,1] => [6,4,8,7,2,5,3,1] => 0000000
[(1,7),(2,4),(3,8),(5,6)] => [4,6,7,2,8,5,1,3] => [6,4,7,8,2,1,5,3] => [6,4,8,7,2,1,5,3] => 0000000
[(1,6),(2,4),(3,8),(5,7)] => [4,6,7,2,8,1,5,3] => [6,4,7,2,8,1,5,3] => [6,4,8,2,7,1,5,3] => 0000000
[(1,5),(2,4),(3,8),(6,7)] => [4,5,7,2,1,8,6,3] => [4,5,2,7,8,1,6,3] => [4,8,2,7,6,1,5,3] => 0000000
[(1,4),(2,5),(3,8),(6,7)] => [4,5,7,1,2,8,6,3] => [4,1,5,7,8,2,6,3] => [4,1,8,7,6,5,3,2] => 0000000
>>> Load all 131 entries. <<<Map
non-nesting-exceedence permutation
Description
The fixed-point-free permutation with deficiencies given by the perfect matching, no alignments and no inversions between exceedences.
Put differently, the exceedences form the unique non-nesting perfect matching whose openers coincide with those of the given perfect matching.
Put differently, the exceedences form the unique non-nesting perfect matching whose openers coincide with those of the given perfect matching.
Map
inverse Foata bijection
Description
The inverse of Foata's bijection.
See Mp00067Foata bijection.
See Mp00067Foata bijection.
Map
Simion-Schmidt map
Description
The Simion-Schmidt map sends any permutation to a $123$-avoiding permutation.
Details can be found in [1].
In particular, this is a bijection between $132$-avoiding permutations and $123$-avoiding permutations, see [1, Proposition 19].
Details can be found in [1].
In particular, this is a bijection between $132$-avoiding permutations and $123$-avoiding permutations, see [1, Proposition 19].
Map
connectivity set
Description
The connectivity set of a permutation as a binary word.
According to [2], also known as the global ascent set.
The connectivity set is
$$C(\pi)=\{i\in [n-1] | \forall 1 \leq j \leq i < k \leq n : \pi(j) < \pi(k)\}.$$
For $n > 1$ it can also be described as the set of occurrences of the mesh pattern
$$([1,2], \{(0,2),(1,0),(1,1),(2,0),(2,1) \})$$
or equivalently
$$([1,2], \{(0,1),(0,2),(1,1),(1,2),(2,0) \}),$$
see [3].
The permutation is connected, when the connectivity set is empty.
According to [2], also known as the global ascent set.
The connectivity set is
$$C(\pi)=\{i\in [n-1] | \forall 1 \leq j \leq i < k \leq n : \pi(j) < \pi(k)\}.$$
For $n > 1$ it can also be described as the set of occurrences of the mesh pattern
$$([1,2], \{(0,2),(1,0),(1,1),(2,0),(2,1) \})$$
or equivalently
$$([1,2], \{(0,1),(0,2),(1,1),(1,2),(2,0) \}),$$
see [3].
The permutation is connected, when the connectivity set is empty.
searching the database
Sorry, this map was not found in the database.