Matrix with Prescribed Eigenvectors

Autor/in	Ahmad, Faiz
Titel	Matrix with Prescribed Eigenvectors
Quelle	In: Mathematics and Computer Education, 45 (2011) 3, S.198-203 (6 Seiten) PDF als Volltext Verfügbarkeit
Sprache	englisch
Dokumenttyp	gedruckt; online; Zeitschriftenaufsatz
ISSN	0730-8639
Schlagwörter	Textbooks; Matrices; Mathematics Instruction; College Mathematics; Undergraduate Study; Mathematical Concepts; Algebra; Mathematical Formulas; Validity; Mathematical Logic + Suchen Sie Ihr Suchwort? Textbook; Text book; Schulbuch; Lehrbuch; Matrizenrechnung; Mathematics lessons; Mathematikunterricht; Grundstudium; Mathematische Formel; Gültigkeit; Mathematical logics; Mathematische Logik
Abstract	It is a routine matter for undergraduates to find eigenvalues and eigenvectors of a given matrix. But the converse problem of finding a matrix with prescribed eigenvalues and eigenvectors is rarely discussed in elementary texts on linear algebra. This problem is related to the "spectral" decomposition of a matrix and has important technical applications not only in linear algebra itself but also in more technical disciplines such as, for example, the study of symmetry groups in crystallography. This article may complement the usual material found in textbooks and whet the students' appetite for advanced topics in linear algebra. In this note, the author starts with a basis which is not necessarily orthonormal and derives a formula for the matrix which possesses members of this basis as eigenvectors. He discusses some problems such as the following: (1) Is it possible for distinct matrices to have the same set of eigenvalues and eigenvectors?; and (2) It is well-known that a symmetric matrix of order "n" possesses a set of "n" orthonormal eigenvectors. Does this mean that if a matrix is "not" symmetric then this property no longer holds? The author also gives a simple proof of the spectral decomposition theorem. (ERIC).
Anmerkungen	MATYC Journal Inc. Mathematics and Computer Education, P.O. Box 158, Old Bethpage, NY 11804. Tel: 516-822-5475; e-mail: macej@optonline.net Web site: http://www.macejournal.org
Erfasst von	ERIC (Education Resources Information Center), Washington, DC
Update	2017/4/10