# Difference between revisions of "Lambda abstraction"

(Somebody who knows WTF they're talking about should probably look at this...) |
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− | In Haskell source code, the Greek letter lambda is replaced by a backslash character ('<hask>\</hask>') instead, since this is easier to type |
+ | In Haskell source code, the Greek letter lambda is replaced by a backslash character ('<hask>\</hask>') instead, since this is easier to type and requires only the basic 7-bit ASCII character set. Similarly, the arrow is replaced with the ASCII character sequence '<hask>-></hask>'. So, for example, the lambda abstraction above would be written in Haskell as |

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− | There is actually a whole mathematical theory devoted to expressing computation entirely using lambda abstractions |
+ | There is actually a whole mathematical theory devoted to expressing computation entirely using lambda abstractions: the [[lambda calculus]]. Most functional programming languages (including Haskell) are based upon some extension of this idea. |

− | When a lambda abstraction is applied to a |
+ | When a lambda abstraction is applied to a value—for instance, <math>(\lambda x \to x^2 ) \ 7</math>—the result of the expression is determined by replacing every [[free variable|free occurrence]] of the parameter variable (in this case <math>x</math>) with the parameter value (in this case <math>7</math>). This is a [[Beta reduction|beta reduction]]. |

## Latest revision as of 19:54, 13 July 2007

A *lambda abstraction* is another name for an anonymous function. It gets its name from the usual notation for writing it: for example, . (Another common, equivalent notation is: .)

In Haskell source code, the Greek letter lambda is replaced by a backslash character ('`\`

') instead, since this is easier to type and requires only the basic 7-bit ASCII character set. Similarly, the arrow is replaced with the ASCII character sequence '`->`

'. So, for example, the lambda abstraction above would be written in Haskell as

```
\ x -> x * x
```

There is actually a whole mathematical theory devoted to expressing computation entirely using lambda abstractions: the lambda calculus. Most functional programming languages (including Haskell) are based upon some extension of this idea.

When a lambda abstraction is applied to a value—for instance, —the result of the expression is determined by replacing every free occurrence of the parameter variable (in this case ) with the parameter value (in this case ). This is a beta reduction.