Effective method
Problem-solving procedures with certain characteristics
From Wikipedia, the free encyclopedia
In metalogic, mathematical logic, and computability theory, an effective method[1] or effective procedure is a finite-time, deterministic procedure for solving a problem from a specific class.[2][3] An effective method is sometimes also called a mechanical method or procedure.[4] Functions for which an effective method exists are sometimes called effectively calculable.
Definition
Formally, a method is called effective to a specific class of problems when it satisfies the following criteria:
- It consists of a finite number of exact, finite instructions.
- When it is applied to a problem from its class:
- It always finishes (terminates) after a finite number of steps.
- It always produces a correct answer.
- In principle, it can be done by a human without any aids except writing materials.
- Its instructions need only to be followed rigorously to succeed. In other words, it requires no ingenuity to succeed.[5]
Optionally, it may also be required that the method never returns a result as if it were an answer when the method is applied to a problem from outside its class. Adding this requirement reduces the set of classes for which there is an effective method.
Algorithms
An effective method for calculating the values of a function is called "an algorithm".
Computable functions
Several independent efforts to give a formal characterization of effective calculability led to a variety of proposed definitions (general recursive functions, Turing machines, λ-calculus) that later were shown to be equivalent. The notion captured by these definitions is known as recursive or effective computability.
The Church–Turing thesis states that the two notions coincide: any number-theoretic function that is effectively calculable is recursively computable. As this is not a mathematical statement, it cannot be proven by a mathematical proof.[citation needed]