• Source: Monodromy matrix

In mathematics, and particularly ordinary differential equations (ODEs), a monodromy matrix is the fundamental matrix of a system of ODEs evaluated at the period of the coefficients of the system. It is used for the analysis of periodic solutions of ODEs in Floquet theory.




See also


Floquet theory
Monodromy
Riemann–Hilbert problem




References


Grass, Dieter; Caulkins, Jonathan P.; Feichtinger, Gustav; Tragler, Gernot; Behrens, Doris A. (2008). Optimal Control of Nonlinear Processes: With Applications in Drugs, Corruption, and Terror. Springer. p. 82. ISBN 9783540776475.
Teschl, Gerald. Ordinary Differential Equations and Dynamical Systems. Providence: American Mathematical Society.

Kata Kunci Pencarian:

• Monodromy matrix
• Monodromy
• Bernhard Riemann
• Multiplier
• Characteristic multiplier
• Floquet theory
• Isomonodromic deformation
• Tavis–Cummings model
• Jordan matrix
• Elliptic surface