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I'm currently taking a CS class in Haskell and I'm having some serious problem understanding some materials.

For one of my assignments, I'm given 2 data types and I'm asked to write a append function that has constant time append.

I'm given:

data NNList a = Sing a | Append ( NNList a) ( NNList a) deriving (Eq)
data CList a = Nil | NotNil ( NNList a) deriving (Eq)

and I'm asked to write a function:

CListAppend :: CList a -> CList a -> CList a

I'm not sure what I missed in my CS education but I often find myself confused with time and space complexity, how would I actually know if a function is constant time? And can anyone provide me on some idea of how to proceed with this question?

My attempt:

CListAppend :: CList a -> CList a -> CList a
CListAppend Nil rl = rl
CListAppend ll Nil = ll
CListAppend ll rl = NotNil $ Append ll rl

This reports and error of returning NNList instead of CList. Is there anyway to convert that?

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3  
You don't want the work performed in your function to vary significantly in the size of the inputs. In your case, you probably don't want to be using recursion in a constant-time solution. –  copumpkin Mar 26 '13 at 1:54
2  
Hint: You have to return a CList. What are the constructors of CList? –  hammar Mar 26 '13 at 2:11
    
@hammar, how do I actually construct something in Haskell? It's certainly not CList $ Append ll rl or anything like that.. –  user1043625 Mar 26 '13 at 2:14
    
@user1043625: The data constructors are on the right hand side of the = in data CList a = ..., so in this case they are Nil and NotNil. –  hammar Mar 26 '13 at 2:24
2  
Doing something in constant time means that the operation is independent of the size of its input (the function always takes the same amount of time, i.e., constant). W.r.t. this your attempt looks promising, except for the type error of course. As others have pointed out: what are the available constructors of CList? You have to use one of them to obtain a CList. –  chris Mar 26 '13 at 2:30

2 Answers 2

up vote 5 down vote accepted

Time complexity is a way to describe how many steps are required to compute the answer relative to the size of the input. What constitutes a step and how you calculate size depends on the problem.

For instance, if you have an unsorted pile of business cards, searching for a particular one will require a number of steps proportional to the number of cards. If you double the size of your pile, the average number of cards you have to examine will also double.

On the other hand, if you pre-sorted the cards, you could play the "high-low" game to cut the size of the pile in half each time you look at a card. Doubling the size of the pile now only requires one extra step when looking for a particular card.

Those are examples of linear and logarithmic time complexities, respectively. In your case, you want constant time complexity. That means no matter how large the two lists are, appending them takes the same number of steps.

You can usually get an idea by walking through the algorithm on paper with different inputs, but there are more precise methods. Here's an example of an append function using the standard [] list implementation:

append []     bs = bs
append (a:as) bs = a : append as bs

We'll count a recursive call to append as one step; alternatively we could count number of invocations of (:). When the first argument is an empty list, [], there are no recursive calls. When the list contains a single element, [1], we evaluate 1 : append [] bs, so we have one recursive call. Now double the input size with [1,2] and count the recursive calls. Then double again with [1,2,3,4], etc. You can then roughly estimate if the number of steps is constant, linear, logarithmic, exponential, etc in the size of the input.

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The last definition is wrong. If ll is NotNil x and rl is NotNil y then your definition should be

CListAppend (NotNil x) (NotNil y) = NotNil ( Append x y )

You are however applying Append on values of type CList a.

Also this solution is constant time. The Append constructor does no processing. Also pattern matching happens in constant time.

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