Received: from 173-13-139-235-sfba.hfc.comcastbusiness.net ([173.13.139.235]:52684 helo=jukni.digitalkingdom.org) by stodi.digitalkingdom.org with smtp (Exim 4.87) (envelope-from ) id 1cmDUw-0001FI-Av for jbovlaste-admin@lojban.org; Thu, 09 Mar 2017 21:53:59 -0800 Received: by jukni.digitalkingdom.org (sSMTP sendmail emulation); Thu, 09 Mar 2017 21:53:54 -0800 From: "Apache" To: curtis289@att.net Reply-To: webmaster@lojban.org Subject: [jvsw] Definition Edited At Word tarmrsilondre -- By krtisfranks Date: Thu, 9 Mar 2017 21:53:54 -0800 MIME-Version: 1.0 Content-Type: text/plain; charset="UTF-8" Message-Id: X-Spam-Score: 0.5 (/) X-Spam_score: 0.5 X-Spam_score_int: 5 X-Spam_bar: / X-Spam-Report: Spam detection software, running on the system "stodi.digitalkingdom.org", has NOT identified this incoming email as spam. The original message has been attached to this so you can view it or label similar future email. If you have any questions, see the administrator of that system for details. Content preview: In jbovlaste, the user krtisfranks has edited a definition of "tarmrsilondre" in the language "English". Differences: 5,5c5,5 < $x_1$ is a set of points/shape (of any number of dimensions) such that $x_1$ is connected and there exists a line L such that for any line L' that is parallel to L, if any subset of L' has nonempty intersection with x1, then there exists exactly one subinterval (line segment) J of L' such that the J has nonzero (Lebesgue) measure, any subset of L' which nonemptily intersects $x_1$ is contained in J, and J has nonempty intersection with $x_1$. An axially-perpendicular cross-section of $x_1$ probably is sufficient to specify $x_2$. See also: {slanu}, {fru'austumu}. --- > $x_1$ is a set of points/shape (of any number of dimensions) such that $x_1$ is connected and there exists a line L such that for any line L' that is parallel to L, if any subset of L' has nonempty intersection with x1, then there exists exactly one subinterval (line segment, ray, or line) J of L' such that the J has nonzero (Lebesgue) measure, any subset of L' which nonemptily intersects $x_1$ is contained in J, and J has nonempty intersection with $x_1$. An axially-perpendicular cross-section of $x_1$ probably is sufficient to specify $x_2$. See also: {slanu}, {fru'austumu}. [...] Content analysis details: (0.5 points, 5.0 required) pts rule name description ---- ---------------------- -------------------------------------------------- 0.0 URIBL_BLOCKED ADMINISTRATOR NOTICE: The query to URIBL was blocked. See http://wiki.apache.org/spamassassin/DnsBlocklists#dnsbl-block for more information. [URIs: lojban.org] 1.4 RCVD_IN_BRBL_LASTEXT RBL: No description available. [173.13.139.235 listed in bb.barracudacentral.org] -1.9 BAYES_00 BODY: Bayes spam probability is 0 to 1% [score: 0.0000] 1.0 RDNS_DYNAMIC Delivered to internal network by host with dynamic-looking rDNS In jbovlaste, the user krtisfranks has edited a definition of "tarmrsilondre" in the language "English". Differences: 5,5c5,5 < $x_1$ is a set of points/shape (of any number of dimensions) such that $x_1$ is connected and there exists a line L such that for any line L' that is parallel to L, if any subset of L' has nonempty intersection with x1, then there exists exactly one subinterval (line segment) J of L' such that the J has nonzero (Lebesgue) measure, any subset of L' which nonemptily intersects $x_1$ is contained in J, and J has nonempty intersection with $x_1$. An axially-perpendicular cross-section of $x_1$ probably is sufficient to specify $x_2$. See also: {slanu}, {fru'austumu}. --- > $x_1$ is a set of points/shape (of any number of dimensions) such that $x_1$ is connected and there exists a line L such that for any line L' that is parallel to L, if any subset of L' has nonempty intersection with x1, then there exists exactly one subinterval (line segment, ray, or line) J of L' such that the J has nonzero (Lebesgue) measure, any subset of L' which nonemptily intersects $x_1$ is contained in J, and J has nonempty intersection with $x_1$. An axially-perpendicular cross-section of $x_1$ probably is sufficient to specify $x_2$. See also: {slanu}, {fru'austumu}. Old Data: Definition: $x_1$ is a generalized cylinder (see notes for details) of form/shape $x_2$. Notes: $x_1$ is a set of points/shape (of any number of dimensions) such that $x_1$ is connected and there exists a line L such that for any line L' that is parallel to L, if any subset of L' has nonempty intersection with x1, then there exists exactly one subinterval (line segment) J of L' such that the J has nonzero (Lebesgue) measure, any subset of L' which nonemptily intersects $x_1$ is contained in J, and J has nonempty intersection with $x_1$. An axially-perpendicular cross-section of $x_1$ probably is sufficient to specify $x_2$. See also: {slanu}, {fru'austumu}. Jargon: Gloss Keywords: Word: cylinder, In Sense: generalized Word: generalized cylinder, In Sense: Place Keywords: New Data: Definition: $x_1$ is a generalized cylinder (see notes for details) of form/shape $x_2$. Notes: $x_1$ is a set of points/shape (of any number of dimensions) such that $x_1$ is connected and there exists a line L such that for any line L' that is parallel to L, if any subset of L' has nonempty intersection with x1, then there exists exactly one subinterval (line segment, ray, or line) J of L' such that the J has nonzero (Lebesgue) measure, any subset of L' which nonemptily intersects $x_1$ is contained in J, and J has nonempty intersection with $x_1$. An axially-perpendicular cross-section of $x_1$ probably is sufficient to specify $x_2$. See also: {slanu}, {fru'austumu}. Jargon: Gloss Keywords: Word: cylinder, In Sense: generalized Word: generalized cylinder, In Sense: Place Keywords: You can go to to see it.