CombinatorialCase110
From NARS2000
This case produces M-Permutations of N items (also called Partial Permutations or Sequences Without Repetition), where when M=N produces the familiar permutations !N. The length of each permutation returned is always M.
- M labeled balls (1), N labeled boxes (1), at most one ball per box (0)
- Sensitive to ⎕IO
- Allows Lexicographic and Gray Code order
- Counted result is an integer scalar
- Generated result is an integer matrix.
The count for this function is !⍠(-M) N where !⍠(M) N calculates the Rising and Falling Factorial.
For example:
If we have 3 labeled balls (❶❷❸) and 3 labeled boxes (123) with at most one ball per box, there are 6 (↔ (!⍠¯3)3 ↔ 3×2×1) ways to meet these criteria:
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The diagram above corresponds to
110 1‼3 ⍝ Permutations in unspecified order
1 2 3
1 3 2
3 1 2
3 2 1
2 3 1
2 1 3
110 2‼3 ⍝ Permutations in Lexicographic order when L=R
1 2 3
1 3 2
2 1 3
2 3 1
3 1 2
3 2 1
110 3‼3 ⍝ Permutations in Gray Code order when L=R
1 2 3
1 3 2
3 1 2
3 2 1
2 3 1
2 1 3
⍝ Permutations of length M of N items
⍝ Labeled balls & boxes, ≤1 # Balls per Box
!3
6
110‼3 3
6
110 0‼3 3
6
⍴110 1‼3 3
6 3
110 1‼3 3
1 2 3
1 3 2
3 1 2
3 2 1
2 3 1
2 1 3
110 1‼2 3
1 2
2 1
2 3
3 2
1 3
3 1
110 2‼2 3 ⍝ Lexicographic order for Permutations with L≠R not implemented as yet
NONCE ERROR
110 2‼2 3
∧
110 3‼2 3 ⍝ Gray Code order for Permutations with L≠R not implemented as yet
NONCE ERROR
110 3‼2 3
∧
110 1‼1 3
1
2
3
A function to calculate the permutations of M items could be defined as
perm←{110 1‼⍵}
