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Subject: [jvsw] Definition Edited At Word fa'ai'ai -- By krtisfranks
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In jbovlaste, the user krtisfranks has edited a
definition of "fa'ai'ai" in the language "English".

Differences:

2,2c2,2
< 		mekso binary or ternary operator: ordered input $(f, g, S)$ where $f$ and $g$ are functions and $S$ is a set of positive integers or "ro" (="all"); output is the function $f$ as applied to an input ordered tuple with $g$ applied to the entries/terms with indices in $S$ (or to all entries/terms if $S$="ro").
---
> 		mekso binary or ternary operator: ordered input $(f, g, S)$ where $f$ and $g$ are functions and $S$ is a set of positive integers or "ro" (="all"); output is a function equivalent to the function $f$ as applied to an input ordered tuple with $g$ applied to the entries/terms with indices in $S$ (or to all entries/terms if $S$="ro").
5,5c5,5
< 		$S$="ro" is default case (making this operator binary); use "{mau'au}" and "{zai'ai}" in order to quote $f$ and $g$ each; the indices in the implicit tuple mentioned in the definition are positive natural numbers such that said tuple is of form $(x_1, x_2, x_3, ..., x_n, ...)$.
---
> 		$S$="ro" is default case (making this operator binary); use "{mau'au}" and "{zai'ai}" in order to quote $f$ and $g$ each; the indices in the implicit tuple mentioned in the definition are positive natural numbers such that said tuple is of form $(x_1, x_2, x_3, ..., x_n, ...)$. For example, maintaining this notation, if $S$="ro", then the output is $f(g(x_1), g(x_2), ..., g(x_n), ...)$; if $S$ = Set(1, 3, 23), then the output is $f(g(x_1), x_2, g(x_3), x_4, x_5, ..., x_{21}, x_{22}, g(x_{23}), x_{24}, x_{25}, ..., x_n, ...)$; vel sim. Obviously, in order to be meaningful, the output of each step along the way must be defined. If $S$ is the empty set and $g$ is defined, then the output is just the function $f$. The output of this operator is a function, so it must have explicit input supplied to it ("it" here referring to the output of this operator) in order to actually have an explicit and concrete result; use mathematical brackets around this operator and its inputs when doing so.
10a11,11
\n> 		Word: extended functional composition, In Sense: 


Old Data:

	Definition:
		mekso binary or ternary operator: ordered input $(f, g, S)$ where $f$ and $g$ are functions and $S$ is a set of positive integers or "ro" (="all"); output is the function $f$ as applied to an input ordered tuple with $g$ applied to the entries/terms with indices in $S$ (or to all entries/terms if $S$="ro").

	Notes:
		$S$="ro" is default case (making this operator binary); use "{mau'au}" and "{zai'ai}" in order to quote $f$ and $g$ each; the indices in the implicit tuple mentioned in the definition are positive natural numbers such that said tuple is of form $(x_1, x_2, x_3, ..., x_n, ...)$.

	Jargon:
		

	Gloss Keywords:

	Place Keywords:



New Data:

	Definition:
		mekso binary or ternary operator: ordered input $(f, g, S)$ where $f$ and $g$ are functions and $S$ is a set of positive integers or "ro" (="all"); output is a function equivalent to the function $f$ as applied to an input ordered tuple with $g$ applied to the entries/terms with indices in $S$ (or to all entries/terms if $S$="ro").

	Notes:
		$S$="ro" is default case (making this operator binary); use "{mau'au}" and "{zai'ai}" in order to quote $f$ and $g$ each; the indices in the implicit tuple mentioned in the definition are positive natural numbers such that said tuple is of form $(x_1, x_2, x_3, ..., x_n, ...)$. For example, maintaining this notation, if $S$="ro", then the output is $f(g(x_1), g(x_2), ..., g(x_n), ...)$; if $S$ = Set(1, 3, 23), then the output is $f(g(x_1), x_2, g(x_3), x_4, x_5, ..., x_{21}, x_{22}, g(x_{23}), x_{24}, x_{25}, ..., x_n, ...)$; vel sim. Obviously, in order to be meaningful, the output of each step along the way must be defined. If $S$ is the empty set and $g$ is defined, then the output is just the function $f$. The output of this operator is a function, so it must have explicit input supplied to it ("it" here referring to the output of this operator) in order to actually have an explicit and concrete result; use mathematical brackets around this operator and its inputs when doing so.

	Jargon:
		

	Gloss Keywords:
		Word: extended functional composition, In Sense: 

	Place Keywords:




You can go to <http://jbovlaste.lojban.org/dict/fa'ai'ai> to see it.