There are linear dynamical systems with Multiple Eigenvectors?

0535372 - ÚT 2021 RIV CZ eng C - Konferenční příspěvek (zahraniční konf.)
Kozánek, Jan - Zapoměl, Jaroslav
There are linear dynamical systems with Multiple Eigenvectors?
Dymamesi 2020. Praha: Institute of Thermomechanics Academy of Sciences of the Czech Republic, v. v. i., 2020 - (Zolotarev, I.; Pešek, L.; Kozieň, M.), s. 13-14. First edition. ISBN 978-80-87012-73-4.
[International colloquium DYMAMESI 2020. Praha (CZ), 03.03.2020-04.03.2020]
Grant ostatní: AV ČR(CZ) StrategieAV21/3
Program: StrategieAV
Institucionální podpora: RVO:61388998
Klíčová slova: non-damped and damped dynamical systems * classical eigenvalue problem * non-linear eigenvalue problem * eigenvectors
Obor OECD: Applied mechanics

The steady-state response of non-damped linear and discrete dynamical systems on harmonic excitation can be expressed as the linear combination of independent eigenvectors. For special damped dynamical systems, there are some case, where the same eigenvector corresponds to the different eigenvalues.
Trvalý link: http://hdl.handle.net/11104/0314834