***************************************************************************** * www.FindStat.org - The Combinatorial Statistic Finder * * * * Copyright (C) 2019 The FindStatCrew * * * * This information is distributed in the hope that it will be useful, * * but WITHOUT ANY WARRANTY; without even the implied warranty of * * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. * ***************************************************************************** ----------------------------------------------------------------------------- Statistic identifier: St001865 ----------------------------------------------------------------------------- Collection: Signed permutations ----------------------------------------------------------------------------- Description: The number of alignments of a signed permutation. An alignment of a signed permutation $\pi\in\mathfrak H_n$ is a pair $-n \leq i \leq j \leq n$, $i,j\neq 0$, such that one of the following conditions hold: * $i < j \leq \pi(j) < \pi(i)$, and $j > 0$ if it is a fixed point, or * $\pi(j) < \pi(i) \leq i < j)$ and $i < 0$ if it is a fixed point, or * $i \leq \pi(i) < \pi(j) \leq j$ and $i > 0$ if it is a fixed point and $j < 0$ if it is a fixed point, or * $\pi(i) \leq i < j \leq \pi(j)$ and $i < 0$ if it is a fixed point and $j > 0$ if it is a fixed point. Let $al$ be the number of alignments of $\pi$, $cr$ be the number of crossings, [[St001862]], and let $fwex$ be the number of flag weak excedances, [[St001817]]. Then $$2 cr + al = n^2 - 2n + fwex.$$ ----------------------------------------------------------------------------- References: [1] Corteel, S., Josuat-Vergès, M., Kim, J. S. Crossings of signed permutations and $q$-Eulerian numbers of type $B$ [[MathSciNet:3096133]] ----------------------------------------------------------------------------- Code: def statistic(pi): n = len(pi) al = [] for j in range(-n, n+1): if j == 0: continue for i in range(-n, j): if i == 0: continue if ((i < j <= pi(j) < pi(i)) and (j < pi(j) or j > 0)): al.append((i, j)) elif ((pi(j) < pi(i) <= i < j) and (pi(i) < i or i < 0)): al.append((i, j)) elif ((i <= pi(i) < pi(j) <= j) and (i < pi(i) or i > 0) and (pi(j) < j or j < 0)): al.append((i, j)) elif ((pi(i) <= i < j <= pi(j)) and (pi(i) < i or i < 0) and (j < pi(j) or j > 0)): al.append((i, j)) return len(al) ----------------------------------------------------------------------------- Statistic values: [1] => 1 [-1] => 0 [1,2] => 4 [1,-2] => 3 [-1,2] => 3 [-1,-2] => 2 [2,1] => 2 [2,-1] => 1 [-2,1] => 1 [-2,-1] => 0 [1,2,3] => 9 [1,2,-3] => 8 [1,-2,3] => 8 [1,-2,-3] => 7 [-1,2,3] => 8 [-1,2,-3] => 7 [-1,-2,3] => 7 [-1,-2,-3] => 6 [1,3,2] => 7 [1,3,-2] => 6 [1,-3,2] => 6 [1,-3,-2] => 5 [-1,3,2] => 6 [-1,3,-2] => 5 [-1,-3,2] => 5 [-1,-3,-2] => 4 [2,1,3] => 7 [2,1,-3] => 6 [2,-1,3] => 6 [2,-1,-3] => 5 [-2,1,3] => 6 [-2,1,-3] => 5 [-2,-1,3] => 5 [-2,-1,-3] => 4 [2,3,1] => 5 [2,3,-1] => 4 [2,-3,1] => 4 [2,-3,-1] => 3 [-2,3,1] => 4 [-2,3,-1] => 3 [-2,-3,1] => 3 [-2,-3,-1] => 2 [3,1,2] => 5 [3,1,-2] => 4 [3,-1,2] => 4 [3,-1,-2] => 3 [-3,1,2] => 4 [-3,1,-2] => 3 [-3,-1,2] => 3 [-3,-1,-2] => 2 [3,2,1] => 7 [3,2,-1] => 6 [3,-2,1] => 2 [3,-2,-1] => 1 [-3,2,1] => 6 [-3,2,-1] => 5 [-3,-2,1] => 1 [-3,-2,-1] => 0 [1,2,3,4] => 16 [1,2,3,-4] => 15 [1,2,-3,4] => 15 [1,2,-3,-4] => 14 [1,-2,3,4] => 15 [1,-2,3,-4] => 14 [1,-2,-3,4] => 14 [1,-2,-3,-4] => 13 [-1,2,3,4] => 15 [-1,2,3,-4] => 14 [-1,2,-3,4] => 14 [-1,2,-3,-4] => 13 [-1,-2,3,4] => 14 [-1,-2,3,-4] => 13 [-1,-2,-3,4] => 13 [-1,-2,-3,-4] => 12 [1,2,4,3] => 14 [1,2,4,-3] => 13 [1,2,-4,3] => 13 [1,2,-4,-3] => 12 [1,-2,4,3] => 13 [1,-2,4,-3] => 12 [1,-2,-4,3] => 12 [1,-2,-4,-3] => 11 [-1,2,4,3] => 13 [-1,2,4,-3] => 12 [-1,2,-4,3] => 12 [-1,2,-4,-3] => 11 [-1,-2,4,3] => 12 [-1,-2,4,-3] => 11 [-1,-2,-4,3] => 11 [-1,-2,-4,-3] => 10 [1,3,2,4] => 14 [1,3,2,-4] => 13 [1,3,-2,4] => 13 [1,3,-2,-4] => 12 [1,-3,2,4] => 13 [1,-3,2,-4] => 12 [1,-3,-2,4] => 12 [1,-3,-2,-4] => 11 [-1,3,2,4] => 13 [-1,3,2,-4] => 12 [-1,3,-2,4] => 12 [-1,3,-2,-4] => 11 [-1,-3,2,4] => 12 [-1,-3,2,-4] => 11 [-1,-3,-2,4] => 11 [-1,-3,-2,-4] => 10 [1,3,4,2] => 12 [1,3,4,-2] => 11 [1,3,-4,2] => 11 [1,3,-4,-2] => 10 [1,-3,4,2] => 11 [1,-3,4,-2] => 10 [1,-3,-4,2] => 10 [1,-3,-4,-2] => 9 [-1,3,4,2] => 11 [-1,3,4,-2] => 10 [-1,3,-4,2] => 10 [-1,3,-4,-2] => 9 [-1,-3,4,2] => 10 [-1,-3,4,-2] => 9 [-1,-3,-4,2] => 9 [-1,-3,-4,-2] => 8 [1,4,2,3] => 12 [1,4,2,-3] => 11 [1,4,-2,3] => 11 [1,4,-2,-3] => 10 [1,-4,2,3] => 11 [1,-4,2,-3] => 10 [1,-4,-2,3] => 10 [1,-4,-2,-3] => 9 [-1,4,2,3] => 11 [-1,4,2,-3] => 10 [-1,4,-2,3] => 10 [-1,4,-2,-3] => 9 [-1,-4,2,3] => 10 [-1,-4,2,-3] => 9 [-1,-4,-2,3] => 9 [-1,-4,-2,-3] => 8 [1,4,3,2] => 14 [1,4,3,-2] => 13 [1,4,-3,2] => 9 [1,4,-3,-2] => 8 [1,-4,3,2] => 13 [1,-4,3,-2] => 12 [1,-4,-3,2] => 8 [1,-4,-3,-2] => 7 [-1,4,3,2] => 13 [-1,4,3,-2] => 12 [-1,4,-3,2] => 8 [-1,4,-3,-2] => 7 [-1,-4,3,2] => 12 [-1,-4,3,-2] => 11 [-1,-4,-3,2] => 7 [-1,-4,-3,-2] => 6 [2,1,3,4] => 14 [2,1,3,-4] => 13 [2,1,-3,4] => 13 [2,1,-3,-4] => 12 [2,-1,3,4] => 13 [2,-1,3,-4] => 12 [2,-1,-3,4] => 12 [2,-1,-3,-4] => 11 [-2,1,3,4] => 13 [-2,1,3,-4] => 12 [-2,1,-3,4] => 12 [-2,1,-3,-4] => 11 [-2,-1,3,4] => 12 [-2,-1,3,-4] => 11 [-2,-1,-3,4] => 11 [-2,-1,-3,-4] => 10 [2,1,4,3] => 12 [2,1,4,-3] => 11 [2,1,-4,3] => 11 [2,1,-4,-3] => 10 [2,-1,4,3] => 11 [2,-1,4,-3] => 10 [2,-1,-4,3] => 10 [2,-1,-4,-3] => 9 [-2,1,4,3] => 11 [-2,1,4,-3] => 10 [-2,1,-4,3] => 10 [-2,1,-4,-3] => 9 [-2,-1,4,3] => 10 [-2,-1,4,-3] => 9 [-2,-1,-4,3] => 9 [-2,-1,-4,-3] => 8 [2,3,1,4] => 12 [2,3,1,-4] => 11 [2,3,-1,4] => 11 [2,3,-1,-4] => 10 [2,-3,1,4] => 11 [2,-3,1,-4] => 10 [2,-3,-1,4] => 10 [2,-3,-1,-4] => 9 [-2,3,1,4] => 11 [-2,3,1,-4] => 10 [-2,3,-1,4] => 10 [-2,3,-1,-4] => 9 [-2,-3,1,4] => 10 [-2,-3,1,-4] => 9 [-2,-3,-1,4] => 9 [-2,-3,-1,-4] => 8 [2,3,4,1] => 10 [2,3,4,-1] => 9 [2,3,-4,1] => 9 [2,3,-4,-1] => 8 [2,-3,4,1] => 9 [2,-3,4,-1] => 8 [2,-3,-4,1] => 8 [2,-3,-4,-1] => 7 [-2,3,4,1] => 9 [-2,3,4,-1] => 8 [-2,3,-4,1] => 8 [-2,3,-4,-1] => 7 [-2,-3,4,1] => 8 [-2,-3,4,-1] => 7 [-2,-3,-4,1] => 7 [-2,-3,-4,-1] => 6 [2,4,1,3] => 10 [2,4,1,-3] => 9 [2,4,-1,3] => 9 [2,4,-1,-3] => 8 [2,-4,1,3] => 9 [2,-4,1,-3] => 8 [2,-4,-1,3] => 8 [2,-4,-1,-3] => 7 [-2,4,1,3] => 9 [-2,4,1,-3] => 8 [-2,4,-1,3] => 8 [-2,4,-1,-3] => 7 [-2,-4,1,3] => 8 [-2,-4,1,-3] => 7 [-2,-4,-1,3] => 7 [-2,-4,-1,-3] => 6 [2,4,3,1] => 12 [2,4,3,-1] => 11 [2,4,-3,1] => 7 [2,4,-3,-1] => 6 [2,-4,3,1] => 11 [2,-4,3,-1] => 10 [2,-4,-3,1] => 6 [2,-4,-3,-1] => 5 [-2,4,3,1] => 11 [-2,4,3,-1] => 10 [-2,4,-3,1] => 6 [-2,4,-3,-1] => 5 [-2,-4,3,1] => 10 [-2,-4,3,-1] => 9 [-2,-4,-3,1] => 5 [-2,-4,-3,-1] => 4 [3,1,2,4] => 12 [3,1,2,-4] => 11 [3,1,-2,4] => 11 [3,1,-2,-4] => 10 [3,-1,2,4] => 11 [3,-1,2,-4] => 10 [3,-1,-2,4] => 10 [3,-1,-2,-4] => 9 [-3,1,2,4] => 11 [-3,1,2,-4] => 10 [-3,1,-2,4] => 10 [-3,1,-2,-4] => 9 [-3,-1,2,4] => 10 [-3,-1,2,-4] => 9 [-3,-1,-2,4] => 9 [-3,-1,-2,-4] => 8 [3,1,4,2] => 10 [3,1,4,-2] => 9 [3,1,-4,2] => 9 [3,1,-4,-2] => 8 [3,-1,4,2] => 9 [3,-1,4,-2] => 8 [3,-1,-4,2] => 8 [3,-1,-4,-2] => 7 [-3,1,4,2] => 9 [-3,1,4,-2] => 8 [-3,1,-4,2] => 8 [-3,1,-4,-2] => 7 [-3,-1,4,2] => 8 [-3,-1,4,-2] => 7 [-3,-1,-4,2] => 7 [-3,-1,-4,-2] => 6 [3,2,1,4] => 14 [3,2,1,-4] => 13 [3,2,-1,4] => 13 [3,2,-1,-4] => 12 [3,-2,1,4] => 9 [3,-2,1,-4] => 8 [3,-2,-1,4] => 8 [3,-2,-1,-4] => 7 [-3,2,1,4] => 13 [-3,2,1,-4] => 12 [-3,2,-1,4] => 12 [-3,2,-1,-4] => 11 [-3,-2,1,4] => 8 [-3,-2,1,-4] => 7 [-3,-2,-1,4] => 7 [-3,-2,-1,-4] => 6 [3,2,4,1] => 12 [3,2,4,-1] => 11 [3,2,-4,1] => 11 [3,2,-4,-1] => 10 [3,-2,4,1] => 7 [3,-2,4,-1] => 6 [3,-2,-4,1] => 6 [3,-2,-4,-1] => 5 [-3,2,4,1] => 11 [-3,2,4,-1] => 10 [-3,2,-4,1] => 10 [-3,2,-4,-1] => 9 [-3,-2,4,1] => 6 [-3,-2,4,-1] => 5 [-3,-2,-4,1] => 5 [-3,-2,-4,-1] => 4 [3,4,1,2] => 8 [3,4,1,-2] => 7 [3,4,-1,2] => 7 [3,4,-1,-2] => 6 [3,-4,1,2] => 7 [3,-4,1,-2] => 6 [3,-4,-1,2] => 6 [3,-4,-1,-2] => 5 [-3,4,1,2] => 7 [-3,4,1,-2] => 6 [-3,4,-1,2] => 6 [-3,4,-1,-2] => 5 [-3,-4,1,2] => 6 [-3,-4,1,-2] => 5 [-3,-4,-1,2] => 5 [-3,-4,-1,-2] => 4 [3,4,2,1] => 10 [3,4,2,-1] => 9 [3,4,-2,1] => 5 [3,4,-2,-1] => 4 [3,-4,2,1] => 9 [3,-4,2,-1] => 8 [3,-4,-2,1] => 4 [3,-4,-2,-1] => 3 [-3,4,2,1] => 9 [-3,4,2,-1] => 8 [-3,4,-2,1] => 4 [-3,4,-2,-1] => 3 [-3,-4,2,1] => 8 [-3,-4,2,-1] => 7 [-3,-4,-2,1] => 3 [-3,-4,-2,-1] => 2 [4,1,2,3] => 10 [4,1,2,-3] => 9 [4,1,-2,3] => 9 [4,1,-2,-3] => 8 [4,-1,2,3] => 9 [4,-1,2,-3] => 8 [4,-1,-2,3] => 8 [4,-1,-2,-3] => 7 [-4,1,2,3] => 9 [-4,1,2,-3] => 8 [-4,1,-2,3] => 8 [-4,1,-2,-3] => 7 [-4,-1,2,3] => 8 [-4,-1,2,-3] => 7 [-4,-1,-2,3] => 7 [-4,-1,-2,-3] => 6 [4,1,3,2] => 12 [4,1,3,-2] => 11 [4,1,-3,2] => 7 [4,1,-3,-2] => 6 [4,-1,3,2] => 11 [4,-1,3,-2] => 10 [4,-1,-3,2] => 6 [4,-1,-3,-2] => 5 [-4,1,3,2] => 11 [-4,1,3,-2] => 10 [-4,1,-3,2] => 6 [-4,1,-3,-2] => 5 [-4,-1,3,2] => 10 [-4,-1,3,-2] => 9 [-4,-1,-3,2] => 5 [-4,-1,-3,-2] => 4 [4,2,1,3] => 12 [4,2,1,-3] => 11 [4,2,-1,3] => 11 [4,2,-1,-3] => 10 [4,-2,1,3] => 7 [4,-2,1,-3] => 6 [4,-2,-1,3] => 6 [4,-2,-1,-3] => 5 [-4,2,1,3] => 11 [-4,2,1,-3] => 10 [-4,2,-1,3] => 10 [-4,2,-1,-3] => 9 [-4,-2,1,3] => 6 [-4,-2,1,-3] => 5 [-4,-2,-1,3] => 5 [-4,-2,-1,-3] => 4 [4,2,3,1] => 14 [4,2,3,-1] => 13 [4,2,-3,1] => 9 [4,2,-3,-1] => 8 [4,-2,3,1] => 9 [4,-2,3,-1] => 8 [4,-2,-3,1] => 4 [4,-2,-3,-1] => 3 [-4,2,3,1] => 13 [-4,2,3,-1] => 12 [-4,2,-3,1] => 8 [-4,2,-3,-1] => 7 [-4,-2,3,1] => 8 [-4,-2,3,-1] => 7 [-4,-2,-3,1] => 3 [-4,-2,-3,-1] => 2 [4,3,1,2] => 10 [4,3,1,-2] => 9 [4,3,-1,2] => 9 [4,3,-1,-2] => 8 [4,-3,1,2] => 5 [4,-3,1,-2] => 4 [4,-3,-1,2] => 4 [4,-3,-1,-2] => 3 [-4,3,1,2] => 9 [-4,3,1,-2] => 8 [-4,3,-1,2] => 8 [-4,3,-1,-2] => 7 [-4,-3,1,2] => 4 [-4,-3,1,-2] => 3 [-4,-3,-1,2] => 3 [-4,-3,-1,-2] => 2 [4,3,2,1] => 12 [4,3,2,-1] => 11 [4,3,-2,1] => 7 [4,3,-2,-1] => 6 [4,-3,2,1] => 7 [4,-3,2,-1] => 6 [4,-3,-2,1] => 2 [4,-3,-2,-1] => 1 [-4,3,2,1] => 11 [-4,3,2,-1] => 10 [-4,3,-2,1] => 6 [-4,3,-2,-1] => 5 [-4,-3,2,1] => 6 [-4,-3,2,-1] => 5 [-4,-3,-2,1] => 1 [-4,-3,-2,-1] => 0 [1,2,3,4,5] => 25 [1,2,3,4,-5] => 24 [1,2,3,-4,5] => 24 [1,2,3,-4,-5] => 23 [1,2,-3,4,5] => 24 [1,2,-3,4,-5] => 23 [1,2,-3,-4,5] => 23 [1,2,-3,-4,-5] => 22 [1,-2,3,4,5] => 24 [1,-2,3,4,-5] => 23 [1,-2,3,-4,5] => 23 [1,-2,3,-4,-5] => 22 [1,-2,-3,4,5] => 23 [1,-2,-3,4,-5] => 22 [1,-2,-3,-4,5] => 22 [1,-2,-3,-4,-5] => 21 [-1,2,3,4,5] => 24 [-1,2,3,4,-5] => 23 [-1,2,3,-4,5] => 23 [-1,2,3,-4,-5] => 22 [-1,2,-3,4,5] => 23 [-1,2,-3,4,-5] => 22 [-1,2,-3,-4,5] => 22 [-1,2,-3,-4,-5] => 21 [-1,-2,3,4,5] => 23 [-1,-2,3,4,-5] => 22 [-1,-2,3,-4,5] => 22 [-1,-2,3,-4,-5] => 21 [-1,-2,-3,4,5] => 22 [-1,-2,-3,4,-5] => 21 [-1,-2,-3,-4,5] => 21 [-1,-2,-3,-4,-5] => 20 [1,2,3,5,4] => 23 [1,2,3,5,-4] => 22 [1,2,3,-5,4] => 22 [1,2,3,-5,-4] => 21 [1,2,-3,5,4] => 22 [1,2,-3,5,-4] => 21 [1,2,-3,-5,4] => 21 [1,2,-3,-5,-4] => 20 [1,-2,3,5,4] => 22 [1,-2,3,5,-4] => 21 [1,-2,3,-5,4] => 21 [1,-2,3,-5,-4] => 20 [1,-2,-3,5,4] => 21 [1,-2,-3,5,-4] => 20 [1,-2,-3,-5,4] => 20 [1,-2,-3,-5,-4] => 19 [-1,2,3,5,4] => 22 [-1,2,3,5,-4] => 21 [-1,2,3,-5,4] => 21 [-1,2,3,-5,-4] => 20 [-1,2,-3,5,4] => 21 [-1,2,-3,5,-4] => 20 [-1,2,-3,-5,4] => 20 [-1,2,-3,-5,-4] => 19 [-1,-2,3,5,4] => 21 [-1,-2,3,5,-4] => 20 [-1,-2,3,-5,4] => 20 [-1,-2,3,-5,-4] => 19 [-1,-2,-3,5,4] => 20 [-1,-2,-3,5,-4] => 19 [-1,-2,-3,-5,4] => 19 [-1,-2,-3,-5,-4] => 18 [1,2,4,3,5] => 23 [1,2,4,3,-5] => 22 [1,2,4,-3,5] => 22 [1,2,4,-3,-5] => 21 [1,2,-4,3,5] => 22 [1,2,-4,3,-5] => 21 [1,2,-4,-3,5] => 21 [1,2,-4,-3,-5] => 20 [1,-2,4,3,5] => 22 [1,-2,4,3,-5] => 21 [1,-2,4,-3,5] => 21 [1,-2,4,-3,-5] => 20 [1,-2,-4,3,5] => 21 [1,-2,-4,3,-5] => 20 [1,-2,-4,-3,5] => 20 [1,-2,-4,-3,-5] => 19 [-1,2,4,3,5] => 22 [-1,2,4,3,-5] => 21 [-1,2,4,-3,5] => 21 [-1,2,4,-3,-5] => 20 [-1,2,-4,3,5] => 21 [-1,2,-4,3,-5] => 20 [-1,2,-4,-3,5] => 20 [-1,2,-4,-3,-5] => 19 [-1,-2,4,3,5] => 21 [-1,-2,4,3,-5] => 20 [-1,-2,4,-3,5] => 20 [-1,-2,4,-3,-5] => 19 [-1,-2,-4,3,5] => 20 [-1,-2,-4,3,-5] => 19 [-1,-2,-4,-3,5] => 19 [-1,-2,-4,-3,-5] => 18 [1,2,4,5,3] => 21 [1,2,4,5,-3] => 20 [1,2,4,-5,3] => 20 [1,2,4,-5,-3] => 19 [1,2,-4,5,3] => 20 [1,2,-4,5,-3] => 19 [1,2,-4,-5,3] => 19 [1,2,-4,-5,-3] => 18 [1,-2,4,5,3] => 20 [1,-2,4,5,-3] => 19 [1,-2,4,-5,3] => 19 [1,-2,4,-5,-3] => 18 [1,-2,-4,5,3] => 19 [1,-2,-4,5,-3] => 18 [1,-2,-4,-5,3] => 18 [1,-2,-4,-5,-3] => 17 [-1,2,4,5,3] => 20 [-1,2,4,5,-3] => 19 [-1,2,4,-5,3] => 19 [-1,2,4,-5,-3] => 18 [-1,2,-4,5,3] => 19 [-1,2,-4,5,-3] => 18 [-1,2,-4,-5,3] => 18 [-1,2,-4,-5,-3] => 17 [-1,-2,4,5,3] => 19 [-1,-2,4,5,-3] => 18 [-1,-2,4,-5,3] => 18 [-1,-2,4,-5,-3] => 17 [-1,-2,-4,5,3] => 18 [-1,-2,-4,5,-3] => 17 [-1,-2,-4,-5,3] => 17 [-1,-2,-4,-5,-3] => 16 [1,2,5,3,4] => 21 [1,2,5,3,-4] => 20 [1,2,5,-3,4] => 20 [1,2,5,-3,-4] => 19 [1,2,-5,3,4] => 20 [1,2,-5,3,-4] => 19 [1,2,-5,-3,4] => 19 [1,2,-5,-3,-4] => 18 [1,-2,5,3,4] => 20 [1,-2,5,3,-4] => 19 [1,-2,5,-3,4] => 19 [1,-2,5,-3,-4] => 18 [1,-2,-5,3,4] => 19 [1,-2,-5,3,-4] => 18 [1,-2,-5,-3,4] => 18 [1,-2,-5,-3,-4] => 17 [-1,2,5,3,4] => 20 [-1,2,5,3,-4] => 19 [-1,2,5,-3,4] => 19 [-1,2,5,-3,-4] => 18 [-1,2,-5,3,4] => 19 [-1,2,-5,3,-4] => 18 [-1,2,-5,-3,4] => 18 [-1,2,-5,-3,-4] => 17 [-1,-2,5,3,4] => 19 [-1,-2,5,3,-4] => 18 [-1,-2,5,-3,4] => 18 [-1,-2,5,-3,-4] => 17 [-1,-2,-5,3,4] => 18 [-1,-2,-5,3,-4] => 17 [-1,-2,-5,-3,4] => 17 [-1,-2,-5,-3,-4] => 16 [1,2,5,4,3] => 23 [1,2,5,4,-3] => 22 [1,2,5,-4,3] => 18 [1,2,5,-4,-3] => 17 [1,2,-5,4,3] => 22 [1,2,-5,4,-3] => 21 [1,2,-5,-4,3] => 17 [1,2,-5,-4,-3] => 16 [1,-2,5,4,3] => 22 [1,-2,5,4,-3] => 21 [1,-2,5,-4,3] => 17 [1,-2,5,-4,-3] => 16 [1,-2,-5,4,3] => 21 [1,-2,-5,4,-3] => 20 [1,-2,-5,-4,3] => 16 [1,-2,-5,-4,-3] => 15 [-1,2,5,4,3] => 22 [-1,2,5,4,-3] => 21 [-1,2,5,-4,3] => 17 [-1,2,5,-4,-3] => 16 [-1,2,-5,4,3] => 21 [-1,2,-5,4,-3] => 20 [-1,2,-5,-4,3] => 16 [-1,2,-5,-4,-3] => 15 [-1,-2,5,4,3] => 21 [-1,-2,5,4,-3] => 20 [-1,-2,5,-4,3] => 16 [-1,-2,5,-4,-3] => 15 [-1,-2,-5,4,3] => 20 [-1,-2,-5,4,-3] => 19 [-1,-2,-5,-4,3] => 15 [-1,-2,-5,-4,-3] => 14 [1,3,2,4,5] => 23 [1,3,2,4,-5] => 22 [1,3,2,-4,5] => 22 [1,3,2,-4,-5] => 21 [1,3,-2,4,5] => 22 [1,3,-2,4,-5] => 21 [1,3,-2,-4,5] => 21 [1,3,-2,-4,-5] => 20 [1,-3,2,4,5] => 22 [1,-3,2,4,-5] => 21 [1,-3,2,-4,5] => 21 [1,-3,2,-4,-5] => 20 [1,-3,-2,4,5] => 21 [1,-3,-2,4,-5] => 20 [1,-3,-2,-4,5] => 20 [1,-3,-2,-4,-5] => 19 [-1,3,2,4,5] => 22 [-1,3,2,4,-5] => 21 [-1,3,2,-4,5] => 21 [-1,3,2,-4,-5] => 20 [-1,3,-2,4,5] => 21 [-1,3,-2,4,-5] => 20 [-1,3,-2,-4,5] => 20 [-1,3,-2,-4,-5] => 19 [-1,-3,2,4,5] => 21 [-1,-3,2,4,-5] => 20 [-1,-3,2,-4,5] => 20 [-1,-3,2,-4,-5] => 19 [-1,-3,-2,4,5] => 20 [-1,-3,-2,4,-5] => 19 [-1,-3,-2,-4,5] => 19 [-1,-3,-2,-4,-5] => 18 [1,3,2,5,4] => 21 [1,3,2,5,-4] => 20 [1,3,2,-5,4] => 20 [1,3,2,-5,-4] => 19 [1,3,-2,5,4] => 20 [1,3,-2,5,-4] => 19 [1,3,-2,-5,4] => 19 [1,3,-2,-5,-4] => 18 [1,-3,2,5,4] => 20 [1,-3,2,5,-4] => 19 [1,-3,2,-5,4] => 19 [1,-3,2,-5,-4] => 18 [1,-3,-2,5,4] => 19 [1,-3,-2,5,-4] => 18 [1,-3,-2,-5,4] => 18 [1,-3,-2,-5,-4] => 17 [-1,3,2,5,4] => 20 [-1,3,2,5,-4] => 19 [-1,3,2,-5,4] => 19 [-1,3,2,-5,-4] => 18 [-1,3,-2,5,4] => 19 [-1,3,-2,5,-4] => 18 [-1,3,-2,-5,4] => 18 [-1,3,-2,-5,-4] => 17 [-1,-3,2,5,4] => 19 [-1,-3,2,5,-4] => 18 [-1,-3,2,-5,4] => 18 [-1,-3,2,-5,-4] => 17 [-1,-3,-2,5,4] => 18 [-1,-3,-2,5,-4] => 17 [-1,-3,-2,-5,4] => 17 [-1,-3,-2,-5,-4] => 16 [1,3,4,2,5] => 21 [1,3,4,2,-5] => 20 [1,3,4,-2,5] => 20 [1,3,4,-2,-5] => 19 [1,3,-4,2,5] => 20 [1,3,-4,2,-5] => 19 [1,3,-4,-2,5] => 19 [1,3,-4,-2,-5] => 18 [1,-3,4,2,5] => 20 [1,-3,4,2,-5] => 19 [1,-3,4,-2,5] => 19 [1,-3,4,-2,-5] => 18 [1,-3,-4,2,5] => 19 [1,-3,-4,2,-5] => 18 [1,-3,-4,-2,5] => 18 [1,-3,-4,-2,-5] => 17 [-1,3,4,2,5] => 20 [-1,3,4,2,-5] => 19 [-1,3,4,-2,5] => 19 [-1,3,4,-2,-5] => 18 [-1,3,-4,2,5] => 19 [-1,3,-4,2,-5] => 18 [-1,3,-4,-2,5] => 18 [-1,3,-4,-2,-5] => 17 [-1,-3,4,2,5] => 19 [-1,-3,4,2,-5] => 18 [-1,-3,4,-2,5] => 18 [-1,-3,4,-2,-5] => 17 [-1,-3,-4,2,5] => 18 [-1,-3,-4,2,-5] => 17 [-1,-3,-4,-2,5] => 17 [-1,-3,-4,-2,-5] => 16 [1,3,4,5,2] => 19 [1,3,4,5,-2] => 18 [1,3,4,-5,2] => 18 [1,3,4,-5,-2] => 17 [1,3,-4,5,2] => 18 [1,3,-4,5,-2] => 17 [1,3,-4,-5,2] => 17 [1,3,-4,-5,-2] => 16 [1,-3,4,5,2] => 18 [1,-3,4,5,-2] => 17 [1,-3,4,-5,2] => 17 [1,-3,4,-5,-2] => 16 [1,-3,-4,5,2] => 17 [1,-3,-4,5,-2] => 16 [1,-3,-4,-5,2] => 16 [1,-3,-4,-5,-2] => 15 [-1,3,4,5,2] => 18 [-1,3,4,5,-2] => 17 [-1,3,4,-5,2] => 17 [-1,3,4,-5,-2] => 16 [-1,3,-4,5,2] => 17 [-1,3,-4,5,-2] => 16 [-1,3,-4,-5,2] => 16 [-1,3,-4,-5,-2] => 15 [-1,-3,4,5,2] => 17 [-1,-3,4,5,-2] => 16 [-1,-3,4,-5,2] => 16 [-1,-3,4,-5,-2] => 15 [-1,-3,-4,5,2] => 16 [-1,-3,-4,5,-2] => 15 [-1,-3,-4,-5,2] => 15 [-1,-3,-4,-5,-2] => 14 [1,3,5,2,4] => 19 [1,3,5,2,-4] => 18 [1,3,5,-2,4] => 18 [1,3,5,-2,-4] => 17 [1,3,-5,2,4] => 18 [1,3,-5,2,-4] => 17 [1,3,-5,-2,4] => 17 [1,3,-5,-2,-4] => 16 [1,-3,5,2,4] => 18 [1,-3,5,2,-4] => 17 [1,-3,5,-2,4] => 17 [1,-3,5,-2,-4] => 16 [1,-3,-5,2,4] => 17 [1,-3,-5,2,-4] => 16 [1,-3,-5,-2,4] => 16 [1,-3,-5,-2,-4] => 15 [-1,3,5,2,4] => 18 [-1,3,5,2,-4] => 17 [-1,3,5,-2,4] => 17 [-1,3,5,-2,-4] => 16 [-1,3,-5,2,4] => 17 [-1,3,-5,2,-4] => 16 [-1,3,-5,-2,4] => 16 [-1,3,-5,-2,-4] => 15 [-1,-3,5,2,4] => 17 [-1,-3,5,2,-4] => 16 [-1,-3,5,-2,4] => 16 [-1,-3,5,-2,-4] => 15 [-1,-3,-5,2,4] => 16 [-1,-3,-5,2,-4] => 15 [-1,-3,-5,-2,4] => 15 [-1,-3,-5,-2,-4] => 14 [1,3,5,4,2] => 21 [1,3,5,4,-2] => 20 [1,3,5,-4,2] => 16 [1,3,5,-4,-2] => 15 [1,3,-5,4,2] => 20 [1,3,-5,4,-2] => 19 [1,3,-5,-4,2] => 15 [1,3,-5,-4,-2] => 14 [1,-3,5,4,2] => 20 [1,-3,5,4,-2] => 19 [1,-3,5,-4,2] => 15 [1,-3,5,-4,-2] => 14 [1,-3,-5,4,2] => 19 [1,-3,-5,4,-2] => 18 [1,-3,-5,-4,2] => 14 [1,-3,-5,-4,-2] => 13 [-1,3,5,4,2] => 20 [-1,3,5,4,-2] => 19 [-1,3,5,-4,2] => 15 [-1,3,5,-4,-2] => 14 [-1,3,-5,4,2] => 19 [-1,3,-5,4,-2] => 18 [-1,3,-5,-4,2] => 14 [-1,3,-5,-4,-2] => 13 [-1,-3,5,4,2] => 19 [-1,-3,5,4,-2] => 18 [-1,-3,5,-4,2] => 14 [-1,-3,5,-4,-2] => 13 [-1,-3,-5,4,2] => 18 [-1,-3,-5,4,-2] => 17 [-1,-3,-5,-4,2] => 13 [-1,-3,-5,-4,-2] => 12 [1,4,2,3,5] => 21 [1,4,2,3,-5] => 20 [1,4,2,-3,5] => 20 [1,4,2,-3,-5] => 19 [1,4,-2,3,5] => 20 [1,4,-2,3,-5] => 19 [1,4,-2,-3,5] => 19 [1,4,-2,-3,-5] => 18 [1,-4,2,3,5] => 20 [1,-4,2,3,-5] => 19 [1,-4,2,-3,5] => 19 [1,-4,2,-3,-5] => 18 [1,-4,-2,3,5] => 19 [1,-4,-2,3,-5] => 18 [1,-4,-2,-3,5] => 18 [1,-4,-2,-3,-5] => 17 [-1,4,2,3,5] => 20 [-1,4,2,3,-5] => 19 [-1,4,2,-3,5] => 19 [-1,4,2,-3,-5] => 18 [-1,4,-2,3,5] => 19 [-1,4,-2,3,-5] => 18 [-1,4,-2,-3,5] => 18 [-1,4,-2,-3,-5] => 17 [-1,-4,2,3,5] => 19 [-1,-4,2,3,-5] => 18 [-1,-4,2,-3,5] => 18 [-1,-4,2,-3,-5] => 17 [-1,-4,-2,3,5] => 18 [-1,-4,-2,3,-5] => 17 [-1,-4,-2,-3,5] => 17 [-1,-4,-2,-3,-5] => 16 [1,4,2,5,3] => 19 [1,4,2,5,-3] => 18 [1,4,2,-5,3] => 18 [1,4,2,-5,-3] => 17 [1,4,-2,5,3] => 18 [1,4,-2,5,-3] => 17 [1,4,-2,-5,3] => 17 [1,4,-2,-5,-3] => 16 [1,-4,2,5,3] => 18 [1,-4,2,5,-3] => 17 [1,-4,2,-5,3] => 17 [1,-4,2,-5,-3] => 16 [1,-4,-2,5,3] => 17 [1,-4,-2,5,-3] => 16 [1,-4,-2,-5,3] => 16 [1,-4,-2,-5,-3] => 15 [-1,4,2,5,3] => 18 [-1,4,2,5,-3] => 17 [-1,4,2,-5,3] => 17 [-1,4,2,-5,-3] => 16 [-1,4,-2,5,3] => 17 [-1,4,-2,5,-3] => 16 [-1,4,-2,-5,3] => 16 [-1,4,-2,-5,-3] => 15 [-1,-4,2,5,3] => 17 [-1,-4,2,5,-3] => 16 [-1,-4,2,-5,3] => 16 [-1,-4,2,-5,-3] => 15 [-1,-4,-2,5,3] => 16 [-1,-4,-2,5,-3] => 15 [-1,-4,-2,-5,3] => 15 [-1,-4,-2,-5,-3] => 14 [1,4,3,2,5] => 23 [1,4,3,2,-5] => 22 [1,4,3,-2,5] => 22 [1,4,3,-2,-5] => 21 [1,4,-3,2,5] => 18 [1,4,-3,2,-5] => 17 [1,4,-3,-2,5] => 17 [1,4,-3,-2,-5] => 16 [1,-4,3,2,5] => 22 [1,-4,3,2,-5] => 21 [1,-4,3,-2,5] => 21 [1,-4,3,-2,-5] => 20 [1,-4,-3,2,5] => 17 [1,-4,-3,2,-5] => 16 [1,-4,-3,-2,5] => 16 [1,-4,-3,-2,-5] => 15 [-1,4,3,2,5] => 22 [-1,4,3,2,-5] => 21 [-1,4,3,-2,5] => 21 [-1,4,3,-2,-5] => 20 [-1,4,-3,2,5] => 17 [-1,4,-3,2,-5] => 16 [-1,4,-3,-2,5] => 16 [-1,4,-3,-2,-5] => 15 [-1,-4,3,2,5] => 21 [-1,-4,3,2,-5] => 20 [-1,-4,3,-2,5] => 20 [-1,-4,3,-2,-5] => 19 [-1,-4,-3,2,5] => 16 [-1,-4,-3,2,-5] => 15 [-1,-4,-3,-2,5] => 15 [-1,-4,-3,-2,-5] => 14 [1,4,3,5,2] => 21 [1,4,3,5,-2] => 20 [1,4,3,-5,2] => 20 [1,4,3,-5,-2] => 19 [1,4,-3,5,2] => 16 [1,4,-3,5,-2] => 15 [1,4,-3,-5,2] => 15 [1,4,-3,-5,-2] => 14 [1,-4,3,5,2] => 20 [1,-4,3,5,-2] => 19 [1,-4,3,-5,2] => 19 [1,-4,3,-5,-2] => 18 [1,-4,-3,5,2] => 15 [1,-4,-3,5,-2] => 14 [1,-4,-3,-5,2] => 14 [1,-4,-3,-5,-2] => 13 [-1,4,3,5,2] => 20 [-1,4,3,5,-2] => 19 [-1,4,3,-5,2] => 19 [-1,4,3,-5,-2] => 18 [-1,4,-3,5,2] => 15 [-1,4,-3,5,-2] => 14 [-1,4,-3,-5,2] => 14 [-1,4,-3,-5,-2] => 13 [-1,-4,3,5,2] => 19 [-1,-4,3,5,-2] => 18 [-1,-4,3,-5,2] => 18 [-1,-4,3,-5,-2] => 17 [-1,-4,-3,5,2] => 14 [-1,-4,-3,5,-2] => 13 [-1,-4,-3,-5,2] => 13 [-1,-4,-3,-5,-2] => 12 [1,4,5,2,3] => 17 [1,4,5,2,-3] => 16 [1,4,5,-2,3] => 16 [1,4,5,-2,-3] => 15 [1,4,-5,2,3] => 16 [1,4,-5,2,-3] => 15 [1,4,-5,-2,3] => 15 [1,4,-5,-2,-3] => 14 [1,-4,5,2,3] => 16 [1,-4,5,2,-3] => 15 [1,-4,5,-2,3] => 15 [1,-4,5,-2,-3] => 14 [1,-4,-5,2,3] => 15 [1,-4,-5,2,-3] => 14 [1,-4,-5,-2,3] => 14 [1,-4,-5,-2,-3] => 13 [-1,4,5,2,3] => 16 [-1,4,5,2,-3] => 15 [-1,4,5,-2,3] => 15 [-1,4,5,-2,-3] => 14 [-1,4,-5,2,3] => 15 [-1,4,-5,2,-3] => 14 [-1,4,-5,-2,3] => 14 [-1,4,-5,-2,-3] => 13 [-1,-4,5,2,3] => 15 [-1,-4,5,2,-3] => 14 [-1,-4,5,-2,3] => 14 [-1,-4,5,-2,-3] => 13 [-1,-4,-5,2,3] => 14 [-1,-4,-5,2,-3] => 13 [-1,-4,-5,-2,3] => 13 [-1,-4,-5,-2,-3] => 12 [1,4,5,3,2] => 19 [1,4,5,3,-2] => 18 [1,4,5,-3,2] => 14 [1,4,5,-3,-2] => 13 [1,4,-5,3,2] => 18 [1,4,-5,3,-2] => 17 [1,4,-5,-3,2] => 13 [1,4,-5,-3,-2] => 12 [1,-4,5,3,2] => 18 [1,-4,5,3,-2] => 17 [1,-4,5,-3,2] => 13 [1,-4,5,-3,-2] => 12 [1,-4,-5,3,2] => 17 [1,-4,-5,3,-2] => 16 [1,-4,-5,-3,2] => 12 [1,-4,-5,-3,-2] => 11 [-1,4,5,3,2] => 18 [-1,4,5,3,-2] => 17 [-1,4,5,-3,2] => 13 [-1,4,5,-3,-2] => 12 [-1,4,-5,3,2] => 17 [-1,4,-5,3,-2] => 16 [-1,4,-5,-3,2] => 12 [-1,4,-5,-3,-2] => 11 [-1,-4,5,3,2] => 17 [-1,-4,5,3,-2] => 16 [-1,-4,5,-3,2] => 12 [-1,-4,5,-3,-2] => 11 [-1,-4,-5,3,2] => 16 [-1,-4,-5,3,-2] => 15 [-1,-4,-5,-3,2] => 11 [-1,-4,-5,-3,-2] => 10 [1,5,2,3,4] => 19 [1,5,2,3,-4] => 18 [1,5,2,-3,4] => 18 [1,5,2,-3,-4] => 17 [1,5,-2,3,4] => 18 [1,5,-2,3,-4] => 17 [1,5,-2,-3,4] => 17 [1,5,-2,-3,-4] => 16 [1,-5,2,3,4] => 18 [1,-5,2,3,-4] => 17 [1,-5,2,-3,4] => 17 [1,-5,2,-3,-4] => 16 [1,-5,-2,3,4] => 17 [1,-5,-2,3,-4] => 16 [1,-5,-2,-3,4] => 16 [1,-5,-2,-3,-4] => 15 [-1,5,2,3,4] => 18 [-1,5,2,3,-4] => 17 [-1,5,2,-3,4] => 17 [-1,5,2,-3,-4] => 16 [-1,5,-2,3,4] => 17 [-1,5,-2,3,-4] => 16 [-1,5,-2,-3,4] => 16 [-1,5,-2,-3,-4] => 15 [-1,-5,2,3,4] => 17 [-1,-5,2,3,-4] => 16 [-1,-5,2,-3,4] => 16 [-1,-5,2,-3,-4] => 15 [-1,-5,-2,3,4] => 16 [-1,-5,-2,3,-4] => 15 [-1,-5,-2,-3,4] => 15 [-1,-5,-2,-3,-4] => 14 [1,5,2,4,3] => 21 [1,5,2,4,-3] => 20 [1,5,2,-4,3] => 16 [1,5,2,-4,-3] => 15 [1,5,-2,4,3] => 20 [1,5,-2,4,-3] => 19 [1,5,-2,-4,3] => 15 [1,5,-2,-4,-3] => 14 [1,-5,2,4,3] => 20 [1,-5,2,4,-3] => 19 [1,-5,2,-4,3] => 15 [1,-5,2,-4,-3] => 14 [1,-5,-2,4,3] => 19 [1,-5,-2,4,-3] => 18 [1,-5,-2,-4,3] => 14 [1,-5,-2,-4,-3] => 13 [-1,5,2,4,3] => 20 [-1,5,2,4,-3] => 19 [-1,5,2,-4,3] => 15 [-1,5,2,-4,-3] => 14 [-1,5,-2,4,3] => 19 [-1,5,-2,4,-3] => 18 [-1,5,-2,-4,3] => 14 [-1,5,-2,-4,-3] => 13 [-1,-5,2,4,3] => 19 [-1,-5,2,4,-3] => 18 [-1,-5,2,-4,3] => 14 [-1,-5,2,-4,-3] => 13 [-1,-5,-2,4,3] => 18 [-1,-5,-2,4,-3] => 17 [-1,-5,-2,-4,3] => 13 [-1,-5,-2,-4,-3] => 12 [1,5,3,2,4] => 21 [1,5,3,2,-4] => 20 [1,5,3,-2,4] => 20 [1,5,3,-2,-4] => 19 [1,5,-3,2,4] => 16 [1,5,-3,2,-4] => 15 [1,5,-3,-2,4] => 15 [1,5,-3,-2,-4] => 14 [1,-5,3,2,4] => 20 [1,-5,3,2,-4] => 19 [1,-5,3,-2,4] => 19 [1,-5,3,-2,-4] => 18 [1,-5,-3,2,4] => 15 [1,-5,-3,2,-4] => 14 [1,-5,-3,-2,4] => 14 [1,-5,-3,-2,-4] => 13 [-1,5,3,2,4] => 20 [-1,5,3,2,-4] => 19 [-1,5,3,-2,4] => 19 [-1,5,3,-2,-4] => 18 [-1,5,-3,2,4] => 15 [-1,5,-3,2,-4] => 14 [-1,5,-3,-2,4] => 14 [-1,5,-3,-2,-4] => 13 [-1,-5,3,2,4] => 19 [-1,-5,3,2,-4] => 18 [-1,-5,3,-2,4] => 18 [-1,-5,3,-2,-4] => 17 [-1,-5,-3,2,4] => 14 [-1,-5,-3,2,-4] => 13 [-1,-5,-3,-2,4] => 13 [-1,-5,-3,-2,-4] => 12 [1,5,3,4,2] => 23 [1,5,3,4,-2] => 22 [1,5,3,-4,2] => 18 [1,5,3,-4,-2] => 17 [1,5,-3,4,2] => 18 [1,5,-3,4,-2] => 17 [1,5,-3,-4,2] => 13 [1,5,-3,-4,-2] => 12 [1,-5,3,4,2] => 22 [1,-5,3,4,-2] => 21 [1,-5,3,-4,2] => 17 [1,-5,3,-4,-2] => 16 [1,-5,-3,4,2] => 17 [1,-5,-3,4,-2] => 16 [1,-5,-3,-4,2] => 12 [1,-5,-3,-4,-2] => 11 [-1,5,3,4,2] => 22 [-1,5,3,4,-2] => 21 [-1,5,3,-4,2] => 17 [-1,5,3,-4,-2] => 16 [-1,5,-3,4,2] => 17 [-1,5,-3,4,-2] => 16 [-1,5,-3,-4,2] => 12 [-1,5,-3,-4,-2] => 11 [-1,-5,3,4,2] => 21 [-1,-5,3,4,-2] => 20 [-1,-5,3,-4,2] => 16 [-1,-5,3,-4,-2] => 15 [-1,-5,-3,4,2] => 16 [-1,-5,-3,4,-2] => 15 [-1,-5,-3,-4,2] => 11 [-1,-5,-3,-4,-2] => 10 [1,5,4,2,3] => 19 [1,5,4,2,-3] => 18 [1,5,4,-2,3] => 18 [1,5,4,-2,-3] => 17 [1,5,-4,2,3] => 14 [1,5,-4,2,-3] => 13 [1,5,-4,-2,3] => 13 [1,5,-4,-2,-3] => 12 [1,-5,4,2,3] => 18 [1,-5,4,2,-3] => 17 [1,-5,4,-2,3] => 17 [1,-5,4,-2,-3] => 16 [1,-5,-4,2,3] => 13 [1,-5,-4,2,-3] => 12 [1,-5,-4,-2,3] => 12 [1,-5,-4,-2,-3] => 11 [-1,5,4,2,3] => 18 [-1,5,4,2,-3] => 17 [-1,5,4,-2,3] => 17 [-1,5,4,-2,-3] => 16 [-1,5,-4,2,3] => 13 [-1,5,-4,2,-3] => 12 [-1,5,-4,-2,3] => 12 [-1,5,-4,-2,-3] => 11 [-1,-5,4,2,3] => 17 [-1,-5,4,2,-3] => 16 [-1,-5,4,-2,3] => 16 [-1,-5,4,-2,-3] => 15 [-1,-5,-4,2,3] => 12 [-1,-5,-4,2,-3] => 11 [-1,-5,-4,-2,3] => 11 [-1,-5,-4,-2,-3] => 10 [1,5,4,3,2] => 21 [1,5,4,3,-2] => 20 [1,5,4,-3,2] => 16 [1,5,4,-3,-2] => 15 [1,5,-4,3,2] => 16 [1,5,-4,3,-2] => 15 [1,5,-4,-3,2] => 11 [1,5,-4,-3,-2] => 10 [1,-5,4,3,2] => 20 [1,-5,4,3,-2] => 19 [1,-5,4,-3,2] => 15 [1,-5,4,-3,-2] => 14 [1,-5,-4,3,2] => 15 [1,-5,-4,3,-2] => 14 [1,-5,-4,-3,2] => 10 [1,-5,-4,-3,-2] => 9 [-1,5,4,3,2] => 20 [-1,5,4,3,-2] => 19 [-1,5,4,-3,2] => 15 [-1,5,4,-3,-2] => 14 [-1,5,-4,3,2] => 15 [-1,5,-4,3,-2] => 14 ----------------------------------------------------------------------------- Created: Dec 01, 2022 at 11:07 by Martin Rubey ----------------------------------------------------------------------------- Last Updated: Dec 01, 2022 at 11:07 by Martin Rubey