# how to convert a propositional logical tree into conjunction normal form (CNF) tree

I have a string like string

``````     s="(=> P (OR (AND A (NOT B)) (AND B (NOT A))))";
``````

and convert it output the CNF of this string,like

( OR ( NOT P ) ( OR A B ) ) ( OR ( NOT P ) ( OR ( NOT B ) ( NOT A ) ) )

do I need to make a struct TreeNode to keep the value?

``````     struct TreeNode {
string val;         // The data in this node.
TreeNode *left;   // Pointer to the left subtree.
TreeNode *right;  // Pointer to the right subtree.
//TreeNode *farther;//should I use farther or not in convert to CNF?
};
``````

how to make it to CNF, which is conjunctive normal form? please give some algorithm detail. from my point of view, maybe use recursive function is better for solving this problem, but I still can not think out how to use recursion. Or you have other suggestion for solving this problem?

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Please do you own work. When you get stuck, ask a specific question. But here's a hint: "recursive descent parser". Another hint: What's the first thing that the program needs to do? –  Jim Balter Apr 18 at 19:30
I just want to know some algorithm and learn something from it, so that I can do my own work, I do not want someone to post source code for me. I do do really hard find useful information and still can not figure out, that's why I ask question here, am I wrong? –  Rebecca Apr 18 at 19:37
In the time you wrote that, you could have googled "recursive descent parser" and been long on your way. –  Jim Balter Apr 18 at 19:39
thanks a lot!!!! –  Rebecca Apr 18 at 19:48

Let's say you name your function `CNF`, taking a tree and returning the tree in CNF.

1. First, replace equivalency `p<=>q` with `AND(p=>q,q=>p)` then replace implications `p=>q` with `OR(q,NOT(p))`.

2. Convert to negation normal form: move all `NOT` operations down the tree, so that the `NOT` operations bind only to atoms (`A`, `B`).

3. Then, the result of `CNF(AND(x,y))` is simple: `AND(CNF(x),CNF(y))`, as it is CNF-like to have `AND`s high in the tree.

4. The result of `CNF(OR(AND(x,y),z))` is a little bit more complicated. Here we will use the rule of distribution of disjunction over conjunction, which is `OR(AND(x,y),z)` is equivalent to `AND(OR(x,z),OR(y,z))`. In effect, `CNF(OR(AND(x,y),z))` will be `AND(OR(CNF(x),CNF(z)),OR(CNF(y),CNF(z))`.

And you're done.

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so you algorithm is recursion or not? what about the imply (=>) in the bottom, X=>Y CNF:not x and Y, if the string is very long, things will be very complicated and a huge work –  Rebecca Apr 18 at 20:08
@Rebecca Adrian addressed implications. Yes, it's recursive ... any tree traversal is. Do you see "AND(CNF(x),CNF(y))", for instance? That's a recursive call of CNF. It's not all that much work for an experienced programmer. If you're not one, maybe you should start with a simpler problem. –  Jim Balter Apr 18 at 20:16
@Rebecca The algorithm's output will be exponential in terms of the size of the input in some cases, for example for `OR(AND(x_1,y_1),AND(x_2,y_2),...AND(x_n,y_n))` the result will be the conjunction of all clauses of the form `OR(z_1, z_2, ..., z_n)` with each `Z_i` being `X_i` or `Y_i`. –  Adrian Panasiuk Apr 18 at 20:21

Simple recursive descent parser solution:

`TreeNode* ParseExpression(const char*& p)`: If the string pointed to by p starts does not start with '(' then return ParseAtom(p), else move p past the '(', call ParseOperation(p), then move p past the ')' and return the value returned by ParseOperation.

`TreeNode* ParseAtom(const char*& p)`: skip p past the atom (contiguous series of non-spaces). Return a TreeNode with the atom as value and NULL left and right.

`TreeNode* ParseOperation(const char*& p)`: The string pointed to by p should start with an operator. Move p past the operator, then determine how many operands the operator takes. If one, Call ParseExpression(p) once; if two, call ParseExpression(p) twice. Then return a TreeNode with the operator as value and the results of the one or two ParseExpression calls as left and right (right should be NULL for an operator with only one operand).

Set a pointer pointing to the original string; call ParseExpression on that pointer; the return value is your tree and the pointer will point past the first expression in your string.

This addresses one of your questions: how to turn a string into a tree. Adrian Panasiuk addressed the other question, how to convert a tree to normal form. Since you're going to be doing additional tree transformations, "value" in your nodes should be called "op" or something like that to stand for "operator" (which is a reserved word in C++), and it should be an enum, not a string.

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so actually, there is no need to convert the string in a tree, which will make things complicated, right? would it be possible that I can use something like substr() and find() and strcpy() to make it into CNF? –  Rebecca Apr 18 at 20:39
@Rebecca Of course there's a need to convert the string to a tree, and I just told you how. –  Jim Balter Apr 18 at 21:22