Does there exist a equation expander for Haskell?

Something like foldr.com: `1+(1+(1+(1+(…))))=∞`

I am new to Haskell I am having trouble understanding why certain equations are more preferable than others. I think it would help if I could see the equations expanded.

For example I found `foldr` vs `foldl` difficult to understand at first until I saw them expanded.

``````foldr :: (a -> b -> b) -> b -> [a] -> b
foldr k z xs = go xs
where
go []     = z
go (y:ys) = y `k` go ys

foldl :: (a -> b -> a) -> a -> [b] -> a
foldl f z0 xs0 = lgo z0 xs0
where
lgo z []     =  z
lgo z (x:xs) = lgo (f z x) xs
``````

From the definitions I can see that `foldr` expands like this:

``````foldr (+) 0 [1..1000000] -->
1 + (foldr (+) 0 [2..1000000]) -->
1 + (2 + (foldr (+) 0 [3..1000000])) -->
1 + (2 + (3 + (foldr (+) 0 [4..1000000]))) -->
1 + (2 + (3 + (4 + (foldr (+) 0 [5..1000000])))) -->
``````

and `foldl` expands like this:

``````foldl (+) 0 [1..1000000] -->
foldl (+) (foldl (+) 0 [1]) [2..1000000]) -->
foldl (+) (foldl (+) (foldl (+) 0 [1])) [3..1000000]) -->
``````
``````let z1 =  0 + 1
in foldl (+) z1 [2..1000000] -->

let z1 =  0 + 1
z2 = z1 + 2
in foldl (+) z2 [3..1000000] -->

let z1 =  0 + 1
z2 = z1 + 2
z3 = z2 + 3
in foldl (+) z3 [4..1000000] -->

let z1 =  0 + 1
z2 = z1 + 2
z3 = z2 + 3
z4 = z3 + 4
in foldl (+) z4 [5..1000000] -->
``````

However, I have trouble on larger equations understanding why things work the way they do in Haskell. For example the first sieve function uses 1000 filters while the second sieve function takes only 24 to find the 1001 prime.

``````primes = sieve [2..]
where
sieve (p:xs) = p : sieve [x | x <- xs, rem x p /= 0]

primes = 2: 3: sieve (tail primes) [5,7..]
where
sieve (p:ps) xs = h ++ sieve ps [x | x <- t, rem x p /= 0]
-- or:  filter ((/=0).(`rem`p)) t
where (h,~(_:t)) = span (< p*p) xs
``````

I have spent a good while working out and expanding by hand. I have come to understand how it works. However, an automated tool to expand certain expressions would greatly improve my understanding of Haskell.

In addition I think it could also serve to help questions that seek to optimize Haskell code:

Is there a tool to expand Haskell expressions?

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I think I remember on the haskell cafe mailing list something that was almost what you want. I think it involved a newtype with a special num instance, but my memory is fuzzy though, I'm not sure I can find it. –  David V. Dec 10 '10 at 7:36
+1 - Good post. –  Mat Nadrofsky Dec 28 '10 at 20:33

David V. Thank you for those links. `Repr` is definitely worth adding to my tool box. I would like to add some additional libraries that I found useful.

HackageDB : Trace (As of December 12, 2010)

• ghc-events library and program: Library and tool for parsing .eventlog files from GHC
• hood library: Debugging by observing in place
• hpc-strobe library: Hpc-generated strobes for a running Haskell program
• hpc-tracer program: Tracer with AJAX interface

The Hook package seems to be what I am looking for. I will post more samples later today.

Hood

``````main = runO ex9

ex9 = print \$ observe "foldl (+) 0 [1..4]" foldl (+) 0 [1..4]
``````

outputs

``````10

-- foldl (+) 0 [1..4]
{ \ { \ 0 1  -> 1
, \ 1 2  -> 3
, \ 3 3  -> 6
, \ 6 4  -> 10
} 0 (1 : 2 : 3 : 4 : [])
-> 10
}
``````

I was unaware of the Hackage library (as I am just getting into Haskell). It reminds me of Perl's CPAN. Thank you for providing those links. This is a great resource.

-

This is in no way a full reply to your question, but I found a conversation on Haskell-Cafe that have some replies :

http://hackage.haskell.org/package/repr that according to the page "allows you to render overloaded expressions to their textual representation"

The example supplied is :

``````*Repr> let rd = 1.5 + 2 + (3 + (-4) * (5 - pi / sqrt 6)) :: Repr Double
*Repr> show rd
"fromRational (3 % 2) + 2 + (3 + negate 4 * (5 - pi / sqrt 6))"
``````
-

This is an answer to an unasked question, think of it as a long comment.

(Please downvote only then below 0, iff you think that it does not fit. I'll remove it then.)

As soon as you are a bit more experienced, you might not want to see the way things expand, anymore. You'll want to understand HOW things work, which then supersedes the question WHY it works; you won't gain much just by observing how it expands, anymore.

The way to analyse the code is much simpler than you might think: Just label every parameter/variable either as "evaluated" or "unevaluated" or "to-be-evaluated", depending on the progression of their causal connections.

Two examples:

1.) fibs

The list of all Fibonacci Numbers is

``````fibs :: (Num a) => [a]
fibs = 1 : 1 : zipWith (+) fibs (tail fibs)
``````

The first two elements are already evaluated; so, label the 3rd element (which has value 2) as to-be-evaluated and all remaining as unevaluated. The 3rd element will then be the (+)-combination of the first elements of fibs and tail fibs, which will be the 1st and 2nd element of fibs, which are already labelled as evaluated. This works with the n-th element to-be-evaluated and the (n-2)-nd and (n-1)-st already evaluated elements respectively.

You can visualize this in different ways, i.e.:

``````  fibs!!(i+0)
+ fibs!!(i+1)
= fibs!!(i+2)

(fibs)
zipWith(+)  (tail fibs)
=   (drop 2 fibs)

1 : 1 : 2 : 3 ...
(1 :)1 : 2 : 3 : 5 ...
(1 : 1 :)2 : 3 : 5 : 8 ...
``````

2.) Your example "sieve (p:ps) xs"

``````primes = 2: 3: sieve (tail primes) [5,7..]
where
sieve (p:ps) xs = h ++ sieve ps [x | x <- t, rem x p /= 0]
-- or:  filter ((/=0).(`rem`p)) t
where (h,~(_:t)) = span (< p*p) xs
``````

In "sieve (p:ps) xs",

• p is evaluated,
• ps is unevaluated, and
• xs is an evaluated infinite partialy-sieved list (not containing p but containing p²), which you can guess reading the recursion and/or recognizing that the values of h need to be prime.

Sieve should return the list of primes after p, so at least the next prime is to-be-evaluated.

• The next prime will be in the list h, which is the list of all (already sieved) numbers k where p < k < p²; h contains only primes because xs does neither contain p nor any number divisible by any prime below p.
• t contains all numbers of xs above p². t should be evaluated lazy instead of as soon as possible, because there might not even be the need to evaluate all elements in h. (Only the first element of h is to-be-evaluated.)

The rest of the function definition is the recursion, where the next xs is t with all n*p sieved out.

In the case of foldr, an analysis will show that the "go" is only defined to speed up the runtime, not the readability. Here is an alternative definition, that is easier to analyse:

``````foldr :: (a -> b -> b) -> b -> [a] -> b
foldr (.:) e (x:xs) = x .: (foldr (.:) e xs)
foldr (.:) e []     = e
``````

I've described its functionality here (without analysis).

To train this type of analysing, you might want to read the sources of some standard libraries; i.e. scanl, scanr, unfoldr in the source of Data.List.

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What is does the function (.:) mean? –  user295190 Dec 23 '10 at 22:36
(.:) is a parameter of type (a->b->b). If you replace (.:) with f, then you would have to replace .: with `f`. –  comonad Dec 24 '10 at 8:51