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I'm working on a little project where I am trying to learn Haskell and whip up a program to help plan student schedules. I have the following types:

data Course =
    { id :: Int, title :: String }
    deriving (Eq, Show)

data Req = Single Course
    | Any [Req]
    | All [Req]
    deriving Show

Now I want to write a method:

satisfies :: [Course] -> Req -> Bool

But I can't figure out how I'm supposed to use the information about the Req to overload the function. How should I proceed?

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Why do you think you need type classes? And I'm guessing that you meant satisfies :: [Courses] -> Req -> Bool but I'm not sure –  jozefg Mar 5 '13 at 0:04
    
I'm just learning. Is there a better way to do this? –  Kyle Mar 5 '13 at 0:05
    
Hang on I'll just write it as an answer –  jozefg Mar 5 '13 at 0:10

2 Answers 2

up vote 4 down vote accepted

First, some typos:

data Course = Course { 
   id :: Int, 
   title :: String 
   } deriving (Eq, Show)

Note the addition of the data constructor name ("Course") and the change from "derives" to "deriving".

data Req = Single Course
    | Any [Req]
    | All [Req]
    deriving Show

Same here.

satisfies :: [Course] -> Req -> Bool

Changed the type from [Courses] to [Course].

course1 = Course 1 "One"
course2 = Course 2 "Two"
course3 = Course 3 "Three"
course4 = Course 4 "Four"
course5 = Course 5 "Five"

req1 = Single course2
req2 = Any [Single course2, Single course3, Single course5]
req3 = All [Single course1, Single course2]
req4 = Any [req2, req3]
req5 = All [req4, req1]

Some Test data.

satisfies cs (Single c) = c `elem` cs

Match the single course requirement. The other two are beautiful in their simplicity, as most of what they do is already defined in the Prelude, and you can read them like English:

satisfies cs (Single c) = c `elem` cs
satisfies cs (Any reqs) = any (satisfies cs) reqs
satisfies cs (All reqs) = all (satisfies cs) reqs

Here are the type signatures of your friends any and all:

any :: (a -> Bool) -> [a] -> Bool
all :: (a -> Bool) -> [a] -> Bool

They both take a boolean function and test it for each member of a list. As we have got a list of requirements, and a test function (which it satisfies used recursively and partially applied to the courses absolved), we can use them directly.

Let's test:

*TestSO15213421> satisfies [course1] req1
False
*TestSO15213421> satisfies [course2] req1
True
*TestSO15213421> satisfies [course1, course2] req1
True
*TestSO15213421> satisfies [course1, course2] req1
True
*TestSO15213421> satisfies [course1, course2] req3
True
*TestSO15213421> satisfies [course1, course3] req3
False
*TestSO15213421> satisfies [course1, course3] req2
True
*TestSO15213421> satisfies [course4] req2
False
*TestSO15213421> satisfies [course4] req5
False
*TestSO15213421> satisfies [course5] req2
True
*TestSO15213421> satisfies [course4] req4
False
*TestSO15213421> satisfies [course2] req4
True
*TestSO15213421> satisfies [course2, course3] req4
True
*TestSO15213421> satisfies [course5, course3] req4
True
*TestSO15213421> satisfies [course5, course3] req5
False

All as expected.

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Haha. I actually ended up coming up with this exact code. Pretty cool. –  Kyle Mar 5 '13 at 17:16

Ok so I'm assuming what you want is to take in a Req and then depending on it, decide whether a given list of Courses satisfy it.

Second I'd make 1 change to make this much less painful,

Req = ... Any [Courses] | All [Courses] ...

instead of [Req]s because really, have requirements that are nested arbitrarily is a bit wonky and weird to deal with for this function.

To do this we're going to do some pattern matching:

satisfies :: [Courses] -> Req -> Bool
satisfies courses (Single course) = undefined
satisfies courses (Any reqs)      = undefined
satisfies courses (All reqs)      = undefined

Ok so now we've go 3 problems.

First, how do we check if a list contains an element? I'll let you figure out how to do this, let's say you figure out a function elem then

satisfies courses (Single course) = course `elem` courses

Second how do we check if 2 lists intersect at all? Let's say the function is inter

satisfies courses (Any reqs)      = courses `inter` reqs

And finally how do we check if a list contains another? Call it contains

satisfies courses (All reqs0)      = courses `contains` reqs

Now this is a pretty common way to handle ADTs. Breaking them apart and doing a sort of case by case analysis.

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Perfect, just what I was looking for. –  Kyle Mar 5 '13 at 0:25
    
No problem happy to help –  jozefg Mar 5 '13 at 0:26
    
Oh, I didn't notice but I actually do need the nesting of the Req = Any [Req] | All [Req] because I want to be able to represent an arbitrarily complex requirement system. I figure between those two (and the Single base case), I should be able to express any dependency I can think of. –  Kyle Mar 5 '13 at 7:50
    
Alright, then it's just a simple matter of instead of just using simple list functions, using slightly more complex ones (you'll have to write them yourself and maybe do some recursion with the Any and All case. It's not a huge deal it just means you can't just drag and drop stuff from Data.List –  jozefg Mar 5 '13 at 8:07
    
@Kyle: Here's some food for thought: how are you going to express the requirement 'at least 3, but no more than 10 courses in the list must have the word "Intermediate" in the title, unless there are 7 or more courses where the id is > 500, in which case there must be exactly 4 "Intermediate" courses'? –  yatima2975 Mar 5 '13 at 10:30

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