Given two sorted vectors
b, find all vectors which are sums of
a and some permutation of
b, and which are unique once sorted.
You can create one of the sought vectors in the following way:
- Take vector
aand a permutation of vector
- Sum them together so
I'm interested in finding the set of
b-permutations that yield the entire set of unique
Gives the summed vectors:
Notice that the permutations of
'yxyx' are equal, because in both cases the "box c" and the "box d" both get exactly one
'x' and one
I guess this is similar to putting
M balls in
M boxes (one in each) with some groups of balls and boxes being identical.
Update: Given a string
b='xxyyzzttqq' your problem will be 10 balls in 4 boxes. There are 4 distinct boxes of size 2, 3, 1 and 4. The balls are pair wise indistinguishable.
Example 1: Given strings are
Reason: We see that all unique permutations of
'dkk'. However with our restraints, the two first permutations are considered equal as the indices on which the differ maps to the same char
'y' in string
Example 2: Given strings are
Example 3: Given strings are
I can solve the problem of generating unique candidate
b permutations using Narayana Pandita's algorithm as decribed on Wikipedia/Permutation.
The second part seams harder. My best shot is to join the two strings pairwise to a list, sort it and use it as a key in a lookup set. (
M is often very big, and as similarities in the strings are common, I currently generate way more
b permutations than actually goes through the set filter. I would love to have an algorithm generating the correct ones directly. Any improvement is welcome.