A characteristic polynomial factorization: extending some matrix eigenvalue estimates

dc.creatorMayer-Foulkes, David
dc.date2019-09-04T14:26:59Z
dc.date2019-09-04T14:26:59Z
dc.date1998
dc.date.accessioned2023-07-21T16:43:53Z
dc.date.available2023-07-21T16:43:53Z
dc.identifier1314.pdf
dc.identifierhttp://hdl.handle.net/11651/3677
dc.identifier.urihttps://repositorioslatinoamericanos.uchile.cl/handle/2250/7735468
dc.descriptionIn this article we present several matrix theorems. The first of these, the theorem on Mondriga matrices, originated in the study of the immobilization of plane and solid figures in Euclidean space by points on their boundary, as posed by Kuperberg and Papadimitriou. In this context the theorem provides the tool to prove that if a Letrahedron satisfies a first-order immobilization condition, it also satisfies a second-order immobilization condition [2]. The first proofs obtained involved the study of many cases (given by the faces of n-dimensional polyhedra). Then we found a characteristic polynomial factorization which gave the result simply. This factorization in turn yielded several seemingly unrelated theorems.
dc.formatapplication/PDF
dc.formatapplication/pdf
dc.languageeng
dc.publisherCentro de Investigación y Docencia Económicas, División de Economía
dc.relationDocumento de trabajo (Centro de Investigación y Docencia Económicas). División de Economía; 28
dc.rightsEl Centro de Investigación y Docencia Económicas A.C. CIDE autoriza a poner en acceso abierto de conformidad con las licencias CREATIVE COMMONS, aprobadas por el Consejo Académico Administrativo del CIDE, las cuales establecen los parámetros de difusión de las obras con fines no comerciales. Lo anterior sin perjuicio de los derechos morales que corresponden a los autores.
dc.rightsCreative Commons Reconocimiento-NoComercial-SinObraDerivada 4.0 International CC BY-NC-ND
dc.subjectMatrices.
dc.subjectPolynomials.
dc.titleA characteristic polynomial factorization: extending some matrix eigenvalue estimates
dc.typeDocumento de trabajo


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