- Search problem
In
computability theory , a search problem is a type ofcomputational problem represented by abinary relation . If "R" is a binary relation such that field("R") ⊆ Γ+ and "T" is aTuring machine , then "T" calculates "f" if:* If "x" is such that there is some "y" such that "R"("x", "y") then "T" accepts "x" with output "z" such that "R"("x", "z") (there may be multiple "y", and "T" need only find one of them)
* If "x" is such that there is no "y" such that "R"("x", "y") then "T" rejects "x"Note that the graph of a partial function is a binary relation, and if "T" calculates a partial function then there is at most one possible output.
A relation "R" can be viewed as a search problem, and a Turing machine which calculates "R" is also said to solve it. Every search problem has a corresponding
decision problem , namely:L(R)={xmid exists y R(x,y)}.
This definition may be generalized to "n"-ary relations using any suitable encoding which allows multiple strings to be compressed into one string (for instance by listing them consecutively with a delimiter).
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