I'm thinking about an algorithm that will create X most unique concatenations of Y parts, where each part can be one of several items. For example 3 parts:
part #1: 0,1,2 part #2: a,b,c part #3: x,y,z
And the (random, one case of some possibilities) result of 5 concatenations:
0ax 1by 2cz 0bz (note that '0by' would be "less unique " than '0bz' because 'by' already was) 2ay (note that 'a' didn't after '2' jet, and 'y' didn't after 'a' jet)
Simple BAD results for next concatenation:
1cy ('c' wasn't after 1, 'y' wasn't after 'c', BUT '1'-'y' already was as first-last
Simple GOOD next result would be:
0cy ('c' wasn't after '0', 'y' wasn't after 'c', and '0'-'y' wasn't as first-last part) 1az 1cx
I know that this solution limit possible results, but when all full unique possibilities will gone, algorithm should continue and try to keep most avaible uniqueness (repeating as few as possible).
Consider real example:
Boy/Girl/Martin bought/stole/get bottle/milk/water
And I want results like:
Boy get milk Martin stole bottle Girl bought water Boy bought bottle (not water, because of 'bought+water' and not milk, because of 'Boy+milk')
Maybe start with a tree of all combinations, but how to select most unique trees first?
Edit: According to this sample data, we can see, that creation of fully unique results for 4 words * 3 possibilities, provide us only 3 results:
Martin stole a bootle Boy bought an milk He get hard water
But, there can be more results requested. So, 4. result should be most-available-uniqueness like
Martin bought hard milk, not
Martin stole a water
Edit: Some start for a solution ? Imagine each part as a barrel, wich can be rotated, and last item goes as first when rotates down, first goes as last when rotating up. Now, set barells like this:
Martin|stole |a |bootle Boy |bought|an |milk He |get |hard|water
Now, write sentences as We see, and rotate first barell UP once, second twice, third three and so on. We get sentences (note that third barell did one full rotation):
Boy |get |a |milk He |stole |an |water Martin|bought|hard|bootle
And we get next solutions. We can do process one more time to get more solutions:
He |bought|a |water Martin|get |an |bootle Boy |stole |hard|milk
The problem is that first barrel will be connected with last, because rotating parallel. I'm wondering if that will be more uniqe if i rotate last barrel one more time in last solution (but the i provide other connections like an-water - but this will be repeated only 2 times, not 3 times like now). Don't know that "barrels" are good way ofthinking here.
I think that we should first found a definition for uniqueness
For example, what is changing uniqueness to drop ? If we use word that was already used ? Do repeating 2 words close to each other is less uniqe that repeating a word in some gap of other words ? So, this problem can be subjective.
But I think that in lot of sequences, each word should be used similar times (like selecting word randomly and removing from a set, and after getting all words refresh all options that they can be obtained next time) - this is easy to do.
But, even if we get each words similar number od times, we should do something to do-not-repeat-connections between words. I think, that more uniqe is repeating words far from each other, not next to each other.