# questions on move up method in Zipper

I am reading the Zipper article in Haskell Wiki and I can't understand the `up` method defined as:

``````data Tree a = Fork (Tree a) (Tree a) | Leaf a

data Cxt a = Top | L (Cxt a) (Tree a) | R (Tree a) (Cxt a)

type Loc a = (Tree a, Cxt a)

up :: Loc a -> Loc a
up (t, L c r) = (Fork t r, c)
up (t, R l c) = (Fork l t, c)
``````

In the pattern `up (t, L c r)`, `t` is the subtree with focus, `c` is the context with a hole at current focus, when moving up, why `c` doesn't move up but still referenced to the old context? Shouldn't the focus also go up?

-

In

``````up (t, L c r) = (Fork t r, c)
``````

not `c` is the current context, but `L c r` is. The context describes a path from your current tree to the root. A context of form `L c r` originates from descending into a left subtree, so in order to go up one layer, we have to combine it with the corresponding right subtree `r`. The `c` is the remaining path up to the root, and therefore becomes the new context.

Let's look at a small example: assume you have a tree that looks like this:

``````   *
/ \
/   \
/ \ / \
1 2 3 4
``````

It would be represented using the `Tree` type as

``````tree = Fork (Fork (Leaf 1) (Leaf 2))
(Fork (Leaf 3) (Leaf 4))
``````

Now the location where `Leaf 3` is selected in the tree looks as follows:

``````loc3 = (Leaf 3, L (R (Fork (Leaf 1) (Leaf 2)) Top) (Leaf 4))
``````

Note that the context here is of the form

``````L c (Leaf 4)
``````

indicating that on the path from your current node up you are in the left subtree of the parent node, and the corresponding right subtree is `Leaf 4`. The `c` is the context for the remaining steps, in this case that the tree `Fork (Leaf 3) (Leaf 4)` is actually the right subtree of the complete tree.

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I asked the same question on SO two years ago and I was not convinced by your answer then, now I accept both. Thanks. –  Sawyer Mar 20 '14 at 2:17