Return-path: Envelope-to: jbovlaste-admin@lojban.org Delivery-date: Tue, 21 Nov 2023 22:45:19 -0800 Received: from [192.168.123.254] (port=55904 helo=jiten.lojban.org) by b39ccf38b4ec with smtp (Exim 4.96) (envelope-from ) id 1r5gz7-004sRG-0L for jbovlaste-admin@lojban.org; Tue, 21 Nov 2023 22:45:19 -0800 Received: by jiten.lojban.org (sSMTP sendmail emulation); Wed, 22 Nov 2023 06:45:16 +0000 From: "Apache" To: curtis289@att.net Reply-To: webmaster@lojban.org Subject: [jvsw] Definition Edited At Word ci'au'i -- By krtisfranks Date: Wed, 22 Nov 2023 06:45:16 +0000 MIME-Version: 1.0 Content-Type: text/plain; charset=UTF-8 Message-Id: X-Spam-Score: -2.9 (--) X-Spam_score: -2.9 X-Spam_score_int: -28 X-Spam_bar: -- In jbovlaste, the user krtisfranks has edited a definition of "ci'au'i" in the language "English". Differences: 2,2c2,2 < mekso at-most-3-ary operator: integer lattice ball; the set of all points belonging to the intersection of $Z^n$ with the closure of the ball that is centered on $X_1$ and has radius $X_2$ in metric $X_3$, where $Z$ is the set of all integers and where, for any set $A$ and non-negative integer $n$, $A^n$ is the set of all $n$-tuples such that each coordinate/entry/term belongs to $A$. --- > mekso at-most-4-ary operator: integer lattice ball; the set of all points belonging to the intersection of $Z^n$ with the closure of the ball that is centered on $X_1$ and has radius $X_2$ in metric $X_3$, where $Z$ is the set of all integers and where, for any set $A$ and non-negative integer $n$, $A^n$ is the set of all $n$-tuples such that each coordinate/entry/term belongs to $A$, and where the dimensionality $n = X_4$.. 5,5c5,5 < $X_3$ defaults to whatsoever metric is specified to apply but which is outside of this function; contextless default is discrete, taxicab, Euclidean, Chebyshev maximum norm; for explicit specification, use "{mau'au}"-"{zai'ai}" quotation. $X_2$ defaults to $1$. $X_1$ defaults to $0 = (0,...,0)$, id est the origin. See also: {mi'i}, {ci'au'u}. --- > $X_3$ defaults to whatsoever metric is specified to apply but which is outside of this function; contextless default is discrete, taxicab, Euclidean, or Chebyshev maximum norm; for explicit specification, use "{mau'au}"-"{zai'ai}" quotation. $X_2$ defaults to $1$. $X_1$ defaults to $0 = (0,...,0)$, where the rhs is an $X_4$-tuple, id est the origin. See also: "{mi'i}", "{ci'au'u}". Old Data: Definition: mekso at-most-3-ary operator: integer lattice ball; the set of all points belonging to the intersection of $Z^n$ with the closure of the ball that is centered on $X_1$ and has radius $X_2$ in metric $X_3$, where $Z$ is the set of all integers and where, for any set $A$ and non-negative integer $n$, $A^n$ is the set of all $n$-tuples such that each coordinate/entry/term belongs to $A$. Notes: $X_3$ defaults to whatsoever metric is specified to apply but which is outside of this function; contextless default is discrete, taxicab, Euclidean, Chebyshev maximum norm; for explicit specification, use "{mau'au}"-"{zai'ai}" quotation. $X_2$ defaults to $1$. $X_1$ defaults to $0 = (0,...,0)$, id est the origin. See also: {mi'i}, {ci'au'u}. Jargon: Gloss Keywords: Word: lattice interval, In Sense: Place Keywords: New Data: Definition: mekso at-most-4-ary operator: integer lattice ball; the set of all points belonging to the intersection of $Z^n$ with the closure of the ball that is centered on $X_1$ and has radius $X_2$ in metric $X_3$, where $Z$ is the set of all integers and where, for any set $A$ and non-negative integer $n$, $A^n$ is the set of all $n$-tuples such that each coordinate/entry/term belongs to $A$, and where the dimensionality $n = X_4$.. Notes: $X_3$ defaults to whatsoever metric is specified to apply but which is outside of this function; contextless default is discrete, taxicab, Euclidean, or Chebyshev maximum norm; for explicit specification, use "{mau'au}"-"{zai'ai}" quotation. $X_2$ defaults to $1$. $X_1$ defaults to $0 = (0,...,0)$, where the rhs is an $X_4$-tuple, id est the origin. See also: "{mi'i}", "{ci'au'u}". Jargon: Gloss Keywords: Word: lattice interval, In Sense: Place Keywords: You can go to to see it.