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I'm new to haskell and was trying to write a function to generate a powerset which only includes consecutive subsets eg: [1,2,3] -> [[],[1],[2],[3],[1,2],[2,3],[1,2,3]]

I found this on a blog http://davidtran.doublegifts.com/blog/?p=7

powerset :: [a] -> [[a]]
powerset []     = [[]]
powerset (x:xs) = powerset xs ++ map (x:) (powerset xs)
-- powerset (x:xs) = powerset xs ++ [x:xs' | xs' <- powerset xs]

but this generates all the subsets i.e [1,3] included which i dont want? is there anyway to fix this code to work or do I have to rethink my approach. Also i do not want to use built in library functions, wanna get my basics right.

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What do you mean by 'consecutive subsets'? –  yatima2975 Mar 22 '12 at 23:21
    
i mean [1,2] [2,3] but not [1,3] –  NyaniOS Mar 22 '12 at 23:46
2  
As a matter of terminology: I usually see people use the term substring to refer to the "consecutive subsets" and the term subsequence for the not necessarily consecutive subsets. –  hugomg Mar 23 '12 at 14:31
    
@missingno: That makes perfect sense! I somehow had the (silly) idea that the subsets themselves must be consecutive (or that you could get from [1,2] to [2,3] by 'adding 1'), not the elements they contain. –  yatima2975 Mar 23 '12 at 19:49

2 Answers 2

up vote 12 down vote accepted

Something like

conseqPower = ([] :) . concatMap (tail . inits) . tails
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i'll try this, but i was rather hoping not to use 2 functions –  NyaniOS Mar 22 '12 at 23:48
2  
Well, you can write your own. But it's more convenient to just reuse existing functions. –  augustss Mar 22 '12 at 23:50
    
ok, thank you very much. –  NyaniOS Mar 22 '12 at 23:58

Filter out the non-"consecutive" lists.

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can i get some code not sure how to filter, or some link to filter function? –  NyaniOS Mar 22 '12 at 23:47
    
@NyaniOS Hoogle it. –  Marcin Mar 22 '12 at 23:51
1  
This approach appears to require Eq a, and still seems difficult in the presence of duplicate items in the list (e.g. consider powerset "hello"). –  dave4420 Mar 23 '12 at 8:34
    
@dave4420 Given that the example is a sequence of distinct integer, I'm not sure this matters for OPs case. –  Marcin Mar 23 '12 at 12:16
1  
That's a pretty bad idea algorithmically speaking though... since his function produce much less output (2 amongst n, so n^2) than powerset (2^n), it's pretty absurd to go to the pain of producing all powersets just to filter out the immense majority of them. –  Jedai Mar 24 '12 at 10:50

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