https://wiki.lojban.io/index.php?action=history&feed=atom&title=fei%27ifei'i - Revision history2026-05-04T09:20:37ZRevision history for this page on the wikiMediaWiki 1.45.3https://wiki.lojban.io/index.php?title=fei%27i&diff=5045&oldid=prevNalvaizmiku: Import words via API2026-01-13T14:53:55Z<p>Import words via API</p>
<p><b>New page</b></p><div>==== valsi ====<br />
fei'i<br />
==== type ====<br />
experimental cmavo<br />
==== creator ====<br />
[[personal/krtisfranks|krtisfranks]]<br />
==== time entered ====<br />
Sat Oct 3 06:36:52 2015<br />
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== English ==<br />
=== Definition #67900 - Preferred ===<br />
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==== selma'o ====<br />
VUhU3<br />
==== definition ====<br />
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mekso variable-arity (at most ternary) operator: number of prime divisors of number <span class="MATH"><i>X</i><sub>1</sub></span>, counting with or without multiplicity according to the value <span class="MATH"><i>X</i><sub>2</sub></span> (<span class="MATH">1</span> xor <span class="MATH">0</span> respectively; see note for equality to <span class="MATH">-1</span> and for default value), in structure <span class="MATH"><i>X</i><sub>3</sub></span>.<br />
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==== notes ====<br />
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<span class="MATH"><i>X</i><sub>1</sub></span> may be a number in a generalized sense: anything living in a ring with primes; most commonly, it will be a positive integer. Units are not considered to be prime factors for the purposes of this counting. <span class="MATH"><i>x</i><sub>2</sub></span> toggles the type of counting and must be exactly one element of Set MATH<br />
$(-1, 0, 1)$<br />
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<span class="MATH">(- 1, 0, 1)</span>. If <span class="MATH"><i>x</i><sub>2</sub> = - 1</span> and <span class="MATH"><i>X</i><sub>3</sub></span> is the typical ring of integers (with the ordering here being the traditional ordering of the integers), then the output is <span class="MATH"><i>k</i> =</span> sup<span class="MATH">(</span>Set<span class="MATH">(<i>i</i> : <i>i</i></span> is a positive integer, and MATH<br />
$v_<a class="undefined" href="../dict/p_i?bg=1;langidarg=2">p_i</a>(X_1) > 0))$<br />
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<span class="MATH"><i>v</i><sub>p<sub>i</sub></sub>(<i>X</i><sub>1</sub>) &gt; 0))</span>, where: <span class="MATH"><i>p</i><sub>i</sub></span> is the <span class="MATH"><i>i</i></span>th prime (such that <span class="MATH"><i>p</i><sub>1</sub> = 2</span>), and <span class="MATH"><i>v</i><sub>p</sub></span> is the <span class="MATH"><i>p</i></span>-adic valuation (see: "[[pau'au|pau'au]]") of the input; in other words, this mode yields the index <span class="MATH"><i>i</i></span> of the greatest prime <span class="MATH"><i>p</i><sub>i</sub></span> which has a nonzero power <span class="MATH"><i>r</i><sub>i</sub></span> such that <span class="MATH"><i>p</i><sub>i</sub><sup>r<sub>i</sub></sup></span> divides <span class="MATH"><i>X</i><sub>1</sub></span>; if <span class="MATH"><i>X</i><sub>1</sub></span> is a unit and <span class="MATH"><i>x</i><sub>2</sub> = - 1</span>, then this word outputs <span class="MATH">0</span>; if <span class="MATH"><i>X</i><sub>1</sub> = 0</span> and <span class="MATH"><i>X</i><sub>2</sub> = - 1</span>, then this word outputs positive infinity; this mode counts early primes which have power <span class="MATH">0</span> in the prime factorization of <span class="MATH"><i>X</i><sub>1</sub></span> but does not count the infinitely many later ones which occur after the last nonzero prime power in that factorization (when <span class="MATH"><i>X</i><sub>1</sub></span> is not <span class="MATH">0</span> and is not a unit). If <span class="MATH"><i>X</i><sub>2</sub> = 0</span>, then the prime factors with nonzero power are counted without multiplicity (they are counted only uniquely and according to their distinctness, ignoring their exponents unless such is <span class="MATH">0</span> (in which case, it is not counted)); in other words, under this condition, this word would function as the number-theoretic prime little-omega function LittleOmega<span class="MATH">(<i>x</i><sub>1</sub>) =</span> Sum MATH<br />
$_<a class="undefined" href="../dict/p%7cX_1?bg=1;langidarg=2">p|X_1</a> (1)$<br />
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<span class="MATH"><sub>p| X<sub>1</sub></sub>(1)</span>, where: the summation is taken over all <span class="MATH"><i>p</i></span>, such that all of the bound <span class="MATH"><i>p</i></span> must be prime, and "<span class="MATH">|</span>" denotes divisibility of the term on the right (second term) by the term on the left (first term). If <span class="MATH"><i>X</i><sub>2</sub> = 1</span>, then multiple factors of the same prime are counted (specifically: the (maximal) exponents of the prime factors in the prime factorization of <span class="MATH"><i>X</i><sub>1</sub></span> are added together); this is the number-theoretic prime big-omega function BigOmega<span class="MATH">(<i>x</i><sub>1</sub>) =</span> Sum MATH<br />
$_<a class="undefined" href="../dict/p%5er%7c%7cX_1?bg=1;langidarg=2">p^r||X_1</a> (1)$<br />
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<span class="MATH"><sub>p<sup>r</sup>|| X<sub>1</sub></sub>(1)</span>, where: the notation is as for <span class="MATH"><i>x</i><sub>2</sub> = - 1</span> or <span class="MATH">0</span> supra as need be, the summation is taken over such <span class="MATH"><i>p</i></span>, and "<span class="MATH">||</span>" denotes the fact that the said corresponding MATH<br />
$r = v_p(X_1)$<br />
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<span class="MATH"><i>r</i> = <i>v</i><sub>p</sub>(<i>X</i><sub>1</sub>)</span> (id est: <span class="MATH"><i>p</i><sup>r</sup></span> is the maximal power of <span class="MATH"><i>p</i></span> which divides <span class="MATH"><i>X</i><sub>1</sub></span>). No other option for the value of <span class="MATH"><i>X</i><sub>2</sub></span> is currently defined. <span class="MATH"><i>X</i><sub>2</sub></span> might have contextual/cultural/conventional defaults, but the contextless default value is <span class="MATH"><i>X</i><sub>2</sub> = 1</span>. <span class="MATH"><i>X</i><sub>3</sub></span> specifies the (algebraic) structure in which primehood/factoring is being considered/performed (equipped also with an ordering of the primes); it need not be specified if the context is clear; if such is sensible for the other inputs, the contextless default for <span class="MATH"><i>X</i><sub>3</sub></span> is the typical ring of integers (with the ordering being the traditional ordering of the integers and the 1st prime being <span class="MATH"><i>p</i><sub>1</sub> = 2</span>). See also: "[[pau'au|pau'au]]"; https://en.wikipedia.org/wiki/Prime_omega_function .<br />
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==== gloss words ====<br />
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<ul><li>[[natlang/en/prime-factor-counting function|prime-factor-counting function]]</li><li>[[natlang/en/prime factors count|prime factors count]]</li><li>[[natlang/en/prime omega function|prime omega function ; big omega]]</li><li>[[natlang/en/prime omega function|prime omega function ; little omega]]</li></ul><br />
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==== created by ====<br />
[[personal/krtisfranks|krtisfranks]]<br />
==== vote information ====<br />
1<br />
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==== time ====<br />
Thu Oct 27 07:25:11 2022<br />
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<br/><font size="+1">Examples</font><br />
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=== Etymology ===</div>Nalvaizmiku