# right function notation

We are said to be using if we write functions to the right of their arguments. That is, if $\alpha :X\to Y$ is a function and $x\in X$, then $x\alpha $ is the image of $x$ under $\alpha $.

Furthermore, if we have a function $\beta :Y\to Z$,
then we write the composition^{} of the two functions
as $\alpha \beta :X\to Z$,
and the image of $x$ under the composition
as $x\alpha \beta =x(\alpha \beta )=(x\alpha )\beta $.

Compare this to left function notation.

Title | right function notation |
---|---|

Canonical name | RightFunctionNotation |

Date of creation | 2013-03-22 12:09:22 |

Last modified on | 2013-03-22 12:09:22 |

Owner | antizeus (11) |

Last modified by | antizeus (11) |

Numerical id | 6 |

Author | antizeus (11) |

Entry type | Definition |

Classification | msc 03E20 |

Synonym | right notation |