Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q2494915> ?p ?o }
Showing triples 1 to 27 of
27
with 100 triples per page.
- Q2494915 subject Q7036089.
- Q2494915 subject Q7451729.
- Q2494915 subject Q7585268.
- Q2494915 abstract "In mathematics, a unipotent element, r, of a ring, R, is one such that r − 1 is a nilpotent element; in other words, (r − 1)n is zero for some n.In particular, a square matrix, M, is a unipotent matrix, if and only if its characteristic polynomial, P(t), is a power of t − 1. Equivalently, M is unipotent if all its eigenvalues are 1. The term quasi-unipotent means that some power is unipotent, for example for a diagonalizable matrix with eigenvalues that are all roots of unity. In an unipotent affine algebraic group all elements are unipotent (see below for the definition of an element being unipotent in such a group).".
- Q2494915 wikiPageWikiLink Q161172.
- Q2494915 wikiPageWikiLink Q1631086.
- Q2494915 wikiPageWikiLink Q1695400.
- Q2494915 wikiPageWikiLink Q1755242.
- Q2494915 wikiPageWikiLink Q1767080.
- Q2494915 wikiPageWikiLink Q190524.
- Q2494915 wikiPageWikiLink Q19810382.
- Q2494915 wikiPageWikiLink Q2739329.
- Q2494915 wikiPageWikiLink Q2997817.
- Q2494915 wikiPageWikiLink Q3554813.
- Q2494915 wikiPageWikiLink Q395.
- Q2494915 wikiPageWikiLink Q5253966.
- Q2494915 wikiPageWikiLink Q564426.
- Q2494915 wikiPageWikiLink Q7036089.
- Q2494915 wikiPageWikiLink Q7280486.
- Q2494915 wikiPageWikiLink Q7451729.
- Q2494915 wikiPageWikiLink Q756747.
- Q2494915 wikiPageWikiLink Q7585268.
- Q2494915 wikiPageWikiLink Q7886915.
- Q2494915 wikiPageWikiLink Q840023.
- Q2494915 wikiPageWikiLink Q849705.
- Q2494915 comment "In mathematics, a unipotent element, r, of a ring, R, is one such that r − 1 is a nilpotent element; in other words, (r − 1)n is zero for some n.In particular, a square matrix, M, is a unipotent matrix, if and only if its characteristic polynomial, P(t), is a power of t − 1. Equivalently, M is unipotent if all its eigenvalues are 1. The term quasi-unipotent means that some power is unipotent, for example for a diagonalizable matrix with eigenvalues that are all roots of unity.".
- Q2494915 label "Unipotent".