Steady-state analysis of nonlinear dynamic systems with periodic excitation based on linearization in harmonic space
- 1 July 1986
- journal article
- Published by Institute of Electrical and Electronics Engineers (IEEE) in Canadian Electrical Engineering Journal
- Vol. 11 (3) , 114-117
- https://doi.org/10.1109/ceej.1986.6594047
Abstract
This paper considers a very general formulation of the differential equations of a dynamic system in periodic steady state. These are linearized around an operating point, in algebraic form in terms of incremental harmonic phasor components. The solution is iterative, either Newton-type with quadratic convergence in the neighbourhood of the solution, or it has linear convergence if the Jacobian is not updated at each iteration.Keywords
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