# Algorithm to check quadtree horizontal symmetry?

``````data (Eq a, Show a) => QT a = C a | Q (QT a) (QT a) (QT a) (QT a)
deriving (Eq, Show)
``````

Giving the definition as above, write a predicate to check if a given image (coded as a quadtree) is symmetric in respect of vertical axis (horizontal symmetric). Use anonymous function where possible.

Question: How would you implement horizontal symmetry check for a given quadtree?

Well, I was thinking at something like this: when a quadtree is just a leaf, in that case we have horizontal symmetry. Base case is when quadtree has just one level (four leafs) symmetry is just a matter of checking the colors `(c1 == c2 && c3 == c4)`.

In any other case, I might check if this condition is recursive satisfied: `nw equals (fliphorizontal(ne)) && sw equals (fliphorizontal(se))`, where `fliphorizontal` flips the quadtree horizontally and `equals` checks if two quadtrees are equal. However I would like to avoid the use of external function as possible, just anonymous ones if possible.

``````ishsymmetric :: (Eq a, Show a) => QT a -> Bool
ishsymmetric (C _)                           = True
ishsymmetric (Q (C c1) (C c2) (C c3) (C c4)) = c1 == c2 && c3 == c4
ishsymmetric (Q nw ne sw se)                 =
``````

EDIT: fliph example:

``````fliph :: (Eq a, Show a) => QT a -> QT a
fliph (C a)           = C a
fliph (Q nw ne sw se) = Q (fliph ne) (fliph nw) (fliph se) (fliph sw)
``````

EDIT: final one-function solution (using generalized fold function for quadtrees):

``````ishsymmetric :: (Eq a, Show a) => QT a -> Bool
ishsymmetric (C _)       = True
ishsymmetric (Q a b c d) = and \$ zipWith equals [a,c] [fliph b,fliph d]
where
fold f g (C c)       = g c
fold f g (Q a b c d) = f (fold f g a) (fold f g b)
(fold f g c) (fold f g d)
fliph q = fold (\a b c d -> Q b a d c) (\c -> C c) q
equals (C c1) (C c2)           = c1 == c2
equals (Q a b c d) (Q e f g h) = and \$ zipWith equals [a,b,c,d] [e,f,g,h]
``````
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@Yasir Arsanukaev: fixed, thanks. –  gremo Feb 5 '11 at 15:53
edited the first post... –  gremo Feb 5 '11 at 15:59
You can collect and report your improvements as comments, and then edit the question later, so that it includes the comments. If you edit the question 8 times, it's made Community Wiki. CW doesn't generate the rep. So don't edit your posts often. –  Yasir Arsanukaev Feb 5 '11 at 16:04
I'm not sure, but maybe `where` syntax would suit your needs :-) freebsd.pastebin.com/QX1Bi0sj –  Yasir Arsanukaev Feb 5 '11 at 16:41
@Yasir Arsanukaev: good starting point, thanks. –  gremo Feb 5 '11 at 16:58

Something like:

``````ishsymmetric :: (Eq a, Show a) => QT a -> Bool
ishsymmetric (C _)                           = True
ishsymmetric (Q (C c1) (C c2) (C c3) (C c4)) = c1 == c2 && c3 == c4
ishsymmetric (Q nw ne sw se) = equals nw (fliph ne) && equals sw (fliph se)
where equals (C a) (C b) = a == b
equals (Q a b c d) (Q e f g h) = equals a e && equals b f && equals c g && equals d h
fliph (C a)           = C a
fliph (Q nw ne sw se) = Q (fliph ne) (fliph nw) (fliph se) (fliph sw)
``````

But syntactic optimizations are possible. :-/

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Or, alternatively: `equals (Q a b c d) (Q e f g h) = and\$zipWith equals [a,b,c,d] [e,f,g,h]` (freebsd.pastebin.com/DgMW4Txh). –  Yasir Arsanukaev Feb 5 '11 at 17:27
@Yasir Arsanukaev: is `and\$` the same thing as doing: `foldr (&&) True (zipWith equals [a, b, c, d] [e, f, g, h])`? –  gremo Feb 5 '11 at 17:42
@Gremo: Yep. You can check function signatures by using `:t all` and `:t foldr (&&) True` in GHCi. They are identical. Moreover, you could use `foldl1`, which is a variant of `foldl` that has no starting value argument. BTW, I've already pointed out to `all` in your previous question "Too many pattern matches to write down for Quadtrees?". :-) Wait, `\$` is an application operator, defined in `Prelude`, see Application operator. –  Yasir Arsanukaev Feb 5 '11 at 17:53
@Yasir Arsanukaev: i like the zipWith solution, is quite concise and elegant. I assume that `and` is not short-circuit like `&&`, right? –  gremo Feb 5 '11 at 18:00
@Gremo: Well, `zipWith` allows you any morphism you'd like (ensured, that the result is a list), while `and` is a shorthand for `foldl1 (&&)`, which produces a list of `Bool` values. Dammit, why am I confusing `all` and `and`? :-) –  Yasir Arsanukaev Feb 5 '11 at 18:06

``````ishsymmetric qt = qt == fliph qt
Do you mean `ishsymmetric qt = equals qt (fliph qt)`? –  gremo Feb 5 '11 at 19:02
@Gremo I'm fairly sure that the `equals` method is rendered unnecessary...since `QT` derives `Eq` already. –  Dan Burton Feb 5 '11 at 21:10