Beta reduction: Difference between revisions
(I think my example actually included an eta-reduction as well as a beta conversion. Edited example.) |
(x is bound in the function, cannot replace free occurrence) |
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A ''beta reduction'' (also written ''β reduction'') is | A ''beta reduction'' (also written ''β reduction'') is the process of calculating a result from the application of a function to an expression. | ||
For example, suppose we | {{Foundations infobox}} | ||
For example, suppose we apply the function | |||
<haskell> | <haskell> | ||
2*x*x + y | (\x -> 2*x*x + y) | ||
</haskell> | </haskell> | ||
to the value <hask>7</hask>. To calculate the result, we substitute <hask>7</hask> for every occurrence of <hask>x</hask>, and so the application of the function | |||
<haskell> | |||
(\x -> 2*x*x + y)(7) | |||
</haskell> | |||
is ''reduced'' to the result | |||
<haskell> | <haskell> | ||
2*7*7 + y | 2*7*7 + y | ||
</haskell> | </haskell> | ||
This is a ''beta reduction''. | |||
(Further reductions could be applied to reduce <hask>2*7*7</hask> to <hask>98</hask>. Although the lambdas are not explicit, they exist hidden in the definition of <hask>(*)</hask>.) | |||
Also see [[Lambda calculus]] and the [http://en.wikipedia.org/wiki/Lambda_calculus wikipedia lambda calculus article]. | Also see [[Lambda calculus]] and the [http://en.wikipedia.org/wiki/Lambda_calculus wikipedia lambda calculus article]. | ||
[[Category:Glossary]] | [[Category:Glossary]] | ||
Latest revision as of 16:57, 6 February 2016
A beta reduction (also written β reduction) is the process of calculating a result from the application of a function to an expression.
For example, suppose we apply the function
(\x -> 2*x*x + y)to the value 7. To calculate the result, we substitute 7 for every occurrence of x, and so the application of the function
(\x -> 2*x*x + y)(7)is reduced to the result
2*7*7 + yThis is a beta reduction.
(Further reductions could be applied to reduce 2*7*7 to 98. Although the lambdas are not explicit, they exist hidden in the definition of (*).)
Also see Lambda calculus and the wikipedia lambda calculus article.