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There are many optimization problems that are known to be NP-hard, such as the traveling salesman problem, MAX-SAT, or finding the minimum chromatic number of a graph. Given a problem of this sort, I'm curious about the complexity of the following problem:

Given an NP-hard optimization problem and a candidate solution S, is S the optimal solution to the problem?

Intuitively, it seems like this might be co-NP hard, since it's easy to refute an answer to an optimization problem by guessing a better solution and using it as a witness, but I have no idea how to show this. In fact, I don't really know how to reason about the complexity of this problem.

Does anyone know of any good lower bounds on the complexity of this decision problem? Knowing whether this was co-NP hard, PSPACE-hard, etc. would be really interesting.

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Assuming that the decision variant of the optimization problem is NP-complete, you've outlined a proof that verifying optimal solutions is in coNP. The most direct route to a hardness result would be a polynomial-time many-one reduction from a coNP-hard problem, but such a reduction would have a difficult time finding a solution to verify. I've taken a graduate-level complexity course and think that this is appropriate for cstheory. –  userOVER9000 Feb 28 '11 at 22:27
If the Optimization was an positive integer minimization problem (i.e. the answer is always a positive integer), you could do a binary search using the "IsOptimal" verifier, and so it seems like that would be NP-Hard too... –  Aryabhatta Feb 28 '11 at 23:01
@Moron: Is this necessarily the case? Note that the problem requires an actual candidate solution, not merely its "value". –  mhum Mar 1 '11 at 0:30
@mhum: I was talking about the case the value is the solution (like chromatic number). Of course you are right that, if you need a colouring this won't work. –  Aryabhatta Mar 1 '11 at 0:34
@Moron: Indeed, I was interpreting the question as saying a "solution" to, say, chromatic number referred to an actual coloring and not merely the chromatic number itself. I came to this interpretation from the part where the asker uses a guessed solution to deduce that this problem is in co-NP. –  mhum Mar 1 '11 at 0:57

3 Answers 3

up vote 4 down vote accepted

The term 'NP-hard optimization problem' seems a bit too broad to let a satisfying answer be found.

For instance, I can't see what precludes decision problems from being considered NP-hard optimization problems - if you consider, say, the MAX-CNF-SAT problem with the solutions being scored as floor(k/N), where k is the number of satisfied clauses and N is the total number of clauses in the instance (which is clearly computable in polynomial time), then any valuation which yields a 1 in this formula will have to satisfy the whole formula. So let's assume that we are maximizing floor(k/N) and call this the FLOOR-CNF-SAT optimization problem:)

This implies you can reduce TAUTOLOGY to said optimization problem - negate the input and add any solution as S. You can even add a dummy variable to make sure the initial solution is gets a 0 in the FLOOR-CNF-SAT problem. Negation is polynomial in time.

Then if a solver for the proposed problem deems S to not be optimal, there must clearly be a valuation which yields a 1 according to our crafted function and thus satisfies the whole formula - in turn providing a valuation that does not satisfy the original input to TAUTOLOGY.

By cheating slightly (using an artificially crafted optimization problem) we have established the 'is optimal' problem as co-NP-complete, since TAUTOLOGY is easily shown to be co-NP-complete.

By your own argument the 'is optimal' decision problem is co-NP-hard, since as a witness you only need a better solution - score S, score the witness and compare.

I don't really feel great about this reduction but I can't easily improve on the problem class. If you require that there be instances which score arbitrarily high and not just {0, 1}, I could just use N * floor(k/N). An improvement to the class could be to only consider a problem an NP-hard optimization problem if for each K there exists an instance that has at least K solutions which all score differently.

I think I can still cheat my way through that:

Consider a reduction that adds N dummy variables to the TAUTOLOGY input as follows:

d1 && d2 && d3 ... && dN && (S)

where S is the negated input. As an initial valuation I choose d1, ..., dN = false, but as a score I give a function that returns 2N - 1 if the first N clauses are all false, otherwise it returns the number of satisfied clauses. Such a function would only return 2N if all the clauses were satisfied but could easily have at least N distinct values.

I am afraid that without some complicated regularity conditions on the scoring function this is the best we can get, unless you consider the definition of an NP-hard optimization problem to be 'a problem for which, given a candidate solution S, we can in polynomial time verify whether S is optimal', in which case 'is-optimal' is clearly P and it's no fun at all:/

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NP-hard problem is "at least as hard as the hardest problems in NP".

Example of NP-hard problem: halting problem (whether program A can stop or not?) :)

Let's say you have a candidate solution: "no, program A can't stop". We know, that you can't verify it -- it's undecidable.

You can't even check if "yes, program A stops" -- because it may take forever, so it's also undecidable.

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The halting problem is not NP-hard. It is undecidable (in general). But how do you verify that a route for a traveling salesman is minimum length? It's supposed to be verifiable in polynomial time. –  phkahler Feb 28 '11 at 21:52
I know, that halting problem is undecidable. I thought, that that there is inclusion - my mistake. –  Marcin Krupowicz Feb 28 '11 at 21:55
Correct me if I'm wrong, but I was under the impression that the halting problem is NP hard in that any problem in NP can be reduced to it in polynomial time. You don't have to be in NP to be NP hard. Am I mistaken about this? –  templatetypedef Feb 28 '11 at 22:05
And to be clear, problem which is in NP and NP-hard is NP-complete. –  Marcin Krupowicz Feb 28 '11 at 22:10
Uh, the halting problem is both undecidable and NP-hard. It's not as if they're mutually exclusive. –  userOVER9000 Feb 28 '11 at 22:11

Because S is a candidate solution; given that there are no other S in which S can be proven to be greedy or less optimal than any other S. It must be that S is at current the MOST optimal solution for the problem.

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