# Conditional Lexicographical Permutations

So I have read on algorithms that can generate lexicographical permutations. Such as: 1-2-3-4-5->1-2-3-5-4->1-2-4-3-5->...->5-4-3-2-1

However I would like to impose some boolean condition where I skip some permutations.

Suppose I have: 1-2-3-4-5 1-2-3-5-4 . . . and I want to skip all other 1-2-X-X-X and go to 1-3-2-4-5

Would swapping 2 and 3 and sorting the remaining three numbers be the best way of doing so? Or is there another way that could be faster?

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What types of boolean condition do you want to use? The one you proposed looks like this: If already generated (1,2,3,4,5) and (1,2,3,5,4) then if beginning of currently generated permutation is (1,2) then skip. Describe boolean conditions you want to use. –  Piotr Jaszkowski Apr 12 at 22:47
So for numbers 1,2,3,4,5 I have 5! permutations. For permutations with 1-2 in front I have 3! permutations of that type. I would like to impose a boolean condition such that when the front two numbers add up to 3 I skip all other permutations of type 1-2-X-X-X and go to 1-3-2-4-5. –  XYZ Apr 12 at 23:03

I still don't really understand your question but from what I see you could base on this piece of code:

``````vector<int> permutation;
for (int i = 1; i < N; ++i)
permutation.push_back(i);
void gen_perm(int level, vector<int>& per){
if (level < N-1);
for (int i = level; i < N; ++i) {
swap(per[level], per[i]);
gen_perm(level + 1, per);
swap(per[level], per[i]);
}
else
print(per) or return per or whatever you want to do with perms.
}
``````

And now, what about conditions? You could pass them to gen_perm function as for example vector of pointers to functions that returns bool and takes level and permutation (reference) and if condition fails at given level then return without doing anything, so let's say you could create a fun like this:

``````bool check_3(int level, vector<int>& perm) {
if (level == 2)
if (perm[0] + perm[1] == 3) return false;
return true;
}
``````

``````typedef bool (*cond_fun)(int, vector<int>&);
``````

the use them in gen_loop like that for example:

``````void gen_perm(int level, vector<int>& per, vector<cond_fun>& conds){
if (level < N-1);
for (int i = 0; i < conds.size(); ++i) {
if (!(*conds[i])(level, per)) return;
}
for (int i = level; i < N; ++i) {
swap(per[level], per[i]);
gen_perm(level + 1, per, conds);
swap(per[level], per[i]);
}
else
print(per) or return per or whatever you want to do with perms.
}
``````

Of course you can improve it if you have additional knowledge like: each condition can fail one time maximum so you can erase them from vector if they return false.

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Well I am trying to use permutations applied to the context of branch and bound. So for each number: 1, 2, 3,... I would have a corresponding "cost" and I would like to prune early one if the cumulative "cost" of a partial permutation exceeds my limit. Once a partial permutation exceeds my limit, I don't want to compute other permutations of that form. I want to skip to the next partial permutation. –  XYZ Apr 12 at 23:41
So in the example I stated, if the cumulative cost with the numbers 1-2 has already exceeded my limit I just want to generate the permutation for 1-3 as I don't want to waste time computing 1-2-3-4-5, 1-2-3-5-4, etc. –  XYZ Apr 12 at 23:45
Thanks for your contribute but for me he issue is how to formulate a routine that allows QUICK transition from a partial permutation to the next order, say from 1-2-X-X-X to 1-3-2-4-5 or 1-2-4-3-5 to 1-2-5-3-4. –  XYZ Apr 12 at 23:46
@XYZ this is what my code does... How does this costs connects to position in permutation? –  Piotr Jaszkowski Apr 12 at 23:46
Your code does not show how you would skip from some permutation say 1-2-4-3-5 -> 1-3-2-4-5. –  XYZ Apr 12 at 23:59