A Direct Transformation of a Matrix Spectrum
Affiliation(s)
1 VNIIEM Corporation’ JSC, Moscow, Russia. 2 Northern (Arctic) Federal University, Severodvinsk, Russia.
1 VNIIEM Corporation’ JSC, Moscow, Russia. 2 Northern (Arctic) Federal University, Severodvinsk, Russia.
ABSTRACT
A method is presented for calculating a matrix spectrum with a given set of eigenvalues. It can be used to build systems with different spectrums with the aim of choosing desired alternative. It enables a practical implementation of control algorithms without resorting to transformation of variables.
A method is presented for calculating a matrix spectrum with a given set of eigenvalues. It can be used to build systems with different spectrums with the aim of choosing desired alternative. It enables a practical implementation of control algorithms without resorting to transformation of variables.
Cite this paper
Iskhakov, A. and Skovpen, S. (2015) A Direct Transformation of a Matrix Spectrum. Advances in Linear Algebra & Matrix Theory, 5, 109-128. doi: 10.4236/alamt.2015.53011.
Iskhakov, A. and Skovpen, S. (2015) A Direct Transformation of a Matrix Spectrum. Advances in Linear Algebra & Matrix Theory, 5, 109-128. doi: 10.4236/alamt.2015.53011.
References
[1] Leonov, G.A. and Shumafov, M.M. (2005) The Methods for Linear Controlled System Stabilization. St.-Petersburg University Publisher, St.-Petersburg. [2] Kuzovkov, N.T. (1976) Modal Control and Observe Devices. Mashinostroenie, Moscow. [3] Krasovsky, A.A. (1987) Control Theory Reference Book. Nauka, Moscow. [4] Islamov, G.G. (1987) On the Control of a Dynamical System Spectrum. Differential Equations, 8, 1299-1302. [5] Iskhakov, A., Pospelov, V. and Skovpen, S. (2012) Non-Frobenius Spectrum-Transformation Method. Applied Mathematics, 1, 1471-1479.
http://dx.doi.org/10.4236/am.2012.330206
[1] Leonov, G.A. and Shumafov, M.M. (2005) The Methods for Linear Controlled System Stabilization. St.-Petersburg University Publisher, St.-Petersburg. [2] Kuzovkov, N.T. (1976) Modal Control and Observe Devices. Mashinostroenie, Moscow. [3] Krasovsky, A.A. (1987) Control Theory Reference Book. Nauka, Moscow. [4] Islamov, G.G. (1987) On the Control of a Dynamical System Spectrum. Differential Equations, 8, 1299-1302. [5] Iskhakov, A., Pospelov, V. and Skovpen, S. (2012) Non-Frobenius Spectrum-Transformation Method. Applied Mathematics, 1, 1471-1479.
http://dx.doi.org/10.4236/am.2012.330206