theoretical computer science computer science (TCS) is a subset of general computer science and mathematics that focuses on mathematical aspects of computer science such as the theory of computation, lambda calculus, and type theory. It is difficult to circumscribe the ...

, a computational problem is a problem that may be solved by an

algorithm In mathematics and computer science, an algorithm () is a finite sequence of rigorous instructions, typically used to solve a class of specific problems or to perform a computation. Algorithms are used as specifications for performing ...

. For example, the problem of factoring :"Given a positive integer ''n'', find a nontrivial prime factor of ''n''." is a computational problem. A computational problem can be viewed as a

set Set, The Set, SET or SETS may refer to: Science, technology, and mathematics Mathematics *Set (mathematics), a collection of elements *Category of sets, the category whose objects and morphisms are sets and total functions, respectively Electro ...

of ''instances'' or ''cases'' together with a, possibly empty, set of ''solutions'' for every instance/case. For example, in the factoring problem, the instances are the integers ''n'', and solutions are prime numbers ''p'' that are the nontrivial prime factors of ''n''. Computational problems are one of the main objects of study in theoretical computer science. The field of

computational complexity theory In theoretical computer science and mathematics, computational complexity theory focuses on classifying computational problems according to their resource usage, and relating these classes to each other. A computational problem is a task solved ...

attempts to determine the amount of resources (

computational complexity In computer science, the computational complexity or simply complexity of an algorithm is the amount of resources required to run it. Particular focus is given to computation time (generally measured by the number of needed elementary operations) ...

) solving a given problem will require and explain why some problems are intractable or undecidable. Computational problems belong to complexity classes that define broadly the resources (e.g. time, space/memory, energy, circuit depth) it takes to compute (solve) them with various

abstract machine An abstract machine is a computer science theoretical model that allows for a detailed and precise analysis of how a computer system functions. It is analogous to a mathematical function in that it receives inputs and produces outputs based on pr ...

s. For example, the complexity class P for classical machines, and BQP for quantum machines. It is typical of many problems to represent both instances and solutions by binary strings, namely elements of ^*. For example, numbers can be represented as binary strings using binary encoding.

Types

Decision problem

decision problem In computability theory and computational complexity theory, a decision problem is a computational problem that can be posed as a yes–no question of the input values. An example of a decision problem is deciding by means of an algorithm whe ...

is a computational problem where the answer for every instance is either yes or no. An example of a decision problem is ''

primality testing A primality test is an algorithm for determining whether an input number is prime. Among other fields of mathematics, it is used for cryptography. Unlike integer factorization, primality tests do not generally give prime factors, only stating wh ...

'': :"Given a positive integer ''n'', determine if ''n'' is prime." A decision problem is typically represented as the set of all instances for which the answer is ''yes''. For example, primality testing can be represented as the infinite set :''L'' =

Search problem

In a

search problem In computational complexity theory and computability theory, a search problem is a type of computational problem represented by a binary relation. If ''R'' is a binary relation such that field(''R'') ⊆ Γ+ and ''T'' is a Turing machine, then '' ...

, the answers can be arbitrary strings. For example, factoring is a search problem where the instances are (string representations of) positive integers and the solutions are (string representations of) collections of primes. A search problem is represented as a relation consisting of all the instance-solution pairs, called a ''search relation''. For example, factoring can be represented as the relation :''R'' = which consist of all pairs of numbers (''n'', ''p''), where ''p'' is a nontrivial prime factor of ''n''.

Counting problem

A counting problem asks for the number of solutions to a given search problem. For example, a counting problem associated with factoring is : "Given a positive integer ''n'', count the number of nontrivial prime factors of ''n''." A counting problem can be represented by a function ''f'' from ^* to the nonnegative integers. For a search relation ''R'', the counting problem associated to ''R'' is the function :''f_R''(x) = , , .

Optimization problem

optimization problem In mathematics, computer science and economics, an optimization problem is the problem of finding the ''best'' solution from all feasible solutions. Optimization problems can be divided into two categories, depending on whether the variables ...

asks for finding a "best possible" solution among the set of all possible solutions to a search problem. One example is the '' maximum independent set'' problem: :"Given a graph ''G'', find an independent set of ''G'' of maximum size." Optimization problems can be represented by their search relations.

Function problem

In a

function problem 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 ...

a single output (of a

total function In mathematics, a partial function from a set to a set is a function from a subset of (possibly itself) to . The subset , that is, the domain of viewed as a function, is called the domain of definition of . If equals , that is, if is de ...

) is expected for every input, but the output is more complex than that of a

, that is, it isn't just "yes" or "no". One of the most famous examples is the '' traveling salesman'' problem: : "Given a list of cities and the distances between each pair of cities, find the shortest possible route that visits each city exactly once and returns to the origin city." It is an

NP-hard In computational complexity theory, NP-hardness ( non-deterministic polynomial-time hardness) is the defining property of a class of problems that are informally "at least as hard as the hardest problems in NP". A simple example of an NP-hard pr ...

problem in

combinatorial optimization Combinatorial optimization is a subfield of mathematical optimization that consists of finding an optimal object from a finite set of objects, where the set of feasible solutions is discrete or can be reduced to a discrete set. Typical combi ...

, important in

operations research Operations research ( en-GB, operational research) (U.S. Air Force Specialty Code: Operations Analysis), often shortened to the initialism OR, is a discipline that deals with the development and application of analytical methods to improve decis ...

and

Promise problem

, it is usually implicitly assumed that any string in ^* represents an instance of the computational problem in question. However, sometimes not all strings ^* represent valid instances, and one specifies a proper subset of ^* as the set of "valid instances". Computational problems of this type are called promise problems. The following is an example of a (decision) promise problem: :"Given a graph ''G'', determine if every independent set in ''G'' has size at most 5, or ''G'' has an independent set of size at least 10." Here, the valid instances are those graphs whose maximum independent set size is either at most 5 or at least 10. Decision promise problems are usually represented as pairs of disjoint subsets (''L''_yes, ''L''_no) of ^*. The valid instances are those in ''L''_yes ∪ ''L''_no. ''L''_yes and ''L''_no represent the instances whose answer is ''yes'' and ''no'', respectively. Promise problems play an important role in several areas of

, including

hardness of approximation In computer science, hardness of approximation is a field that studies the algorithmic complexity of finding near-optimal solutions to optimization problems. Scope Hardness of approximation complements the study of approximation algorithms by pr ...

property testing In computer science, a property testing algorithm for a decision problem is an algorithm whose query complexity to its input is much smaller than the instance size of the problem. Typically property testing algorithms are used to distinguish if s ...

, and interactive proof systems.

Notes

References

*. *. *{{citation, first1=Oded, last1=Goldreich, author1-link=Oded Goldreich, first2=Avi, last2=Wigderson, author2-link=Avi Wigderson, contribution=IV.20 Computational Complexity, pages=575–604, title= The Princeton Companion to Mathematics, editor1-first=Timothy, editor1-last=Gowers, editor1-link=Timothy Gowers, editor2-first=June, editor2-last=Barrow-Green, editor3-first=Imre, editor3-last=Leader, editor3-link=Imre Leader, year=2008, publisher=Princeton University Press, isbn=978-0-691-11880-2. Theoretical computer science