Details
- Autor(en) / Beteiligte
- Titel
- Roth’s solvability criteria for the matrix equations AX - XB^ = C and X - AXB^ = C over the skew field of quaternions with aninvolutive automorphism q ¿ qˆ
- Ort / Verlag
- Elsevier
- Erscheinungsjahr
- 2016
- Quelle
- Alma/SFX Local Collection
- Beschreibungen/Notizen
- The matrix equation AX-XB = C has a solution if and only if the matrices A C 0 B and A 0 0 B are similar. This criterion was proved over a field by W.E. Roth (1952) and over the skew field of quaternions by Huang Liping (1996). H.K. Wimmer (1988) proved that the matrix equation X - AXB = C over a field has a solution if and only if the matrices A C 0 I and I 0 0 B are simultaneously equivalent to A 0 0 I and I 0 0 B . We extend these criteria to the matrix equations AX- ^ XB = C and X - A ^ XB = C over the skew field of quaternions with a fixed involutive automorphism q ¿ ˆq.
- Sprache
- Englisch
- Identifikatoren
- ISSN: 0024-3795DOI: 10.1016/j.laa.2016.08.022Titel-ID: cdi_csuc_recercat_oai_recercat_cat_2072_281528
- Format
- –
- Schlagworte
- Anàlisi matemàtica, Differential equations, Equacions diferencials, Equacions funcionals, Matemàtica discreta, Matemàtiques i estadística, Matrices, Matrius (Matemàtica), Quaternion matrix equations, Roth's criteria for solvability, Sylvester matrix equations, Teoria de grafs, Àrees temàtiques de la UPC