Matrices over differential fields which commute with their derivative

Authors

William A. Adkins, Louisiana State University
Jean Claude Evard, University of Wyoming
Robert M. Guralnick, University of Southern California

Document Type

Article

Publication Date

9-1-1993

Abstract

A theorem is proved concerning the diagonalizability of a matrix over a differential field by means of a similarity transformation from the field of constants of the differential field. This result contains, as a special case, known results concerning the diagonalizability over the complex numbers of a Hermitian matrix of analytic functions under the hypothesis that the matrix commutes with its derivative. © 1993.

Publication Source (Journal or Book title)

Linear Algebra and Its Applications

First Page

253

Last Page

261

Recommended Citation

Adkins, W., Evard, J., & Guralnick, R. (1993). Matrices over differential fields which commute with their derivative. Linear Algebra and Its Applications, 190 (C), 253-261. https://doi.org/10.1016/0024-3795(93)90230-L