Function problem

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In computational complexity theory, a function problem is a computational problem where a single output (of a total function) is expected for every input, but the output is more complex than that of a decision problem. For function problems, the output is not simply 'yes' or 'no'.

Formal definition

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A functional problem   is defined by a relation   over strings of an arbitrary alphabet  :

 

An algorithm solves   if for every input   such that there exists a   satisfying  , the algorithm produces one such  , and if there are no such  , it rejects.

A promise function problem is allowed to do anything (thus may not terminate) if no such   exists.

Examples

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A well-known function problem is given by the Functional Boolean Satisfiability Problem, FSAT for short. The problem, which is closely related to the SAT decision problem, can be formulated as follows:

Given a boolean formula   with variables  , find an assignment   such that   evaluates to   or decide that no such assignment exists.

In this case the relation   is given by tuples of suitably encoded boolean formulas and satisfying assignments. While a SAT algorithm, fed with a formula  , only needs to return "unsatisfiable" or "satisfiable", an FSAT algorithm needs to return some satisfying assignment in the latter case.

Other notable examples include the travelling salesman problem, which asks for the route taken by the salesman, and the integer factorization problem, which asks for the list of factors.

Relationship to other complexity classes

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Consider an arbitrary decision problem   in the class NP. By the definition of NP, each problem instance   that is answered 'yes' has a polynomial-size certificate   which serves as a proof for the 'yes' answer. Thus, the set of these tuples   forms a relation, representing the function problem "given   in  , find a certificate   for  ". This function problem is called the function variant of  ; it belongs to the class FNP.

FNP can be thought of as the function class analogue of NP, in that solutions of FNP problems can be efficiently (i.e., in polynomial time in terms of the length of the input) verified, but not necessarily efficiently found. In contrast, the class FP, which can be thought of as the function class analogue of P, consists of function problems whose solutions can be found in polynomial time.

Self-reducibility

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Observe that the problem FSAT introduced above can be solved using only polynomially many calls to a subroutine which decides the SAT problem: An algorithm can first ask whether the formula   is satisfiable. After that the algorithm can fix variable   to TRUE and ask again. If the resulting formula is still satisfiable the algorithm keeps   fixed to TRUE and continues to fix  , otherwise it decides that   has to be FALSE and continues. Thus, FSAT is solvable in polynomial time using an oracle deciding SAT. In general, a problem in NP is called self-reducible if its function variant can be solved in polynomial time using an oracle deciding the original problem. Every NP-complete problem is self-reducible. It is conjectured [by whom?] that the integer factorization problem is not self-reducible, because deciding whether an integer is prime is in P (easy),[1] while the integer factorization problem is believed to be hard for a classical computer. There are several (slightly different) notions of self-reducibility.[2][3][4]

Reductions and complete problems

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Function problems can be reduced much like decision problems: Given function problems   and   we say that   reduces to   if there exists polynomially-time computable functions   and   such that for all instances   of   and possible solutions   of  , it holds that

  • If   has an  -solution, then   has an  -solution.
  •  

It is therefore possible to define FNP-complete problems analogous to the NP-complete problem:

A problem   is FNP-complete if every problem in FNP can be reduced to  . The complexity class of FNP-complete problems is denoted by FNP-C or FNPC. Hence the problem FSAT is also an FNP-complete problem, and it holds that   if and only if  .

Total function problems

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The relation   used to define function problems has the drawback of being incomplete: Not every input   has a counterpart   such that  . Therefore the question of computability of proofs is not separated from the question of their existence. To overcome this problem it is convenient to consider the restriction of function problems to total relations yielding the class TFNP as a subclass of FNP. This class contains problems such as the computation of pure Nash equilibria in certain strategic games where a solution is guaranteed to exist. In addition, if TFNP contains any FNP-complete problem it follows that  .

See also

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References

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  1. ^ Agrawal, Manindra; Kayal, Neeraj; Saxena, Nitin (2004). "PRIMES is in P" (PDF). Annals of Mathematics. 160 (2): 781–793. doi:10.4007/annals.2004.160.781. JSTOR 3597229.
  2. ^ Ko, K. (1983). "On self-reducibility and weak P-selectivity". Journal of Computer and System Sciences. 26 (2): 209–221. doi:10.1016/0022-0000(83)90013-2.
  3. ^ Schnorr, C. (1976). "Optimal algorithms for self-reducible problems". In S. Michaelson and R. Milner, Editors, Proceedings of the 3rd International Colloquium on Automata, Languages, and Programming: 322–337.
  4. ^ Selman, A. (1988). "Natural self-reducible sets". SIAM Journal on Computing. 17 (5): 989–996. doi:10.1137/0217062.
  • Raymond Greenlaw, H. James Hoover, Fundamentals of the theory of computation: principles and practice, Morgan Kaufmann, 1998, ISBN 1-55860-474-X, p. 45-51
  • Elaine Rich, Automata, computability and complexity: theory and applications, Prentice Hall, 2008, ISBN 0-13-228806-0, section 28.10 "The problem classes FP and FNP", pp. 689–694