tag:blogger.com,1999:blog-187082042011-12-13T19:58:15.172-08:00Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.comBlogger81100tag:blogger.com,1999:blog-18708204.post-57385036087607360432008-11-10T01:01:00.000-08:002008-11-10T01:02:00.985-08:00Álgebra de Grassmann<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-5738503608760736043?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-86292608892334220942008-11-10T01:00:00.001-08:002008-11-10T01:00:10.464-08:00Super álgebra de Lie.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-8629260889233422094?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-1131331654331496152005-11-06T18:47:00.000-08:002005-11-06T18:47:34.333-08:00<a href="http://www.mate.uncor.edu/vaq2001/pf/abstracts_difusion.html">http://www.mate.uncor.edu/vaq2001/pf/abstracts_difusion.html</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-113133165433149615?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-1131331573199377532005-11-06T14:51:00.000-08:002005-11-06T18:46:13.210-08:00<a href="http://myweb.lmu.edu/acrans/researchstatement.pdf">http://myweb.lmu.edu/acrans/researchstatement.pdf</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-113133157319937753?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-1131317412396109132005-11-06T14:50:00.000-08:002005-11-06T14:50:12.396-08:00<a href="http://arxiv.org/PS_cache/hep-th/pdf/9601/9601063.pdf">http://arxiv.org/PS_cache/hep-th/pdf/9601/9601063.pdf</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-113131741239610913?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-1131317327782739462005-11-06T14:48:00.000-08:002005-11-06T14:48:47.783-08:00<a href="http://www.tac.mta.ca/tac/volumes/12/15/12-15.pdf">http://www.tac.mta.ca/tac/volumes/12/15/12-15.pdf</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-113131732778273946?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-1131317274981619572005-11-06T14:46:00.000-08:002005-11-06T14:47:54.986-08:00es bilineal, es decir, [a x + b y, z] = a [x, z] + b [y, z] y [z, a x + b y] = a [z, x] + b [z, y] para todo a, b en F y todo x, y, z en g.<br />satisface la identidad de Jacobi, es decir, [[x, y], z] + [[z, x], y] + [[y, z], x] = 0 para todo x, y, z en g.<br />[x, x] = 0 para todo x en g.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-113131727498161957?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0tag:blogger.com,1999:blog-18708204.post-1131313329238938592005-11-06T13:40:00.000-08:002005-11-06T13:42:09.243-08:00Álgebra de Lie<br />En matemáticas, un álgebra de Lie (nombrada así por Sophus Lie) es una estructura algebraica cuyo uso principal reside en el estudio de objetos geométricos tales como grupos de Lie y variedades diferenciables.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/18708204-113131332923893859?l=algebradelie.blogspot.com' alt='' /></div>Adolfo Catralhttp://www.blogger.com/profile/10738236054509496915noreply@blogger.com0