A projective direct method for the computation of hopf bifurcation points
DOI10.1080/00207169508804404zbMath0847.65035OpenAlexW2015097950MaRDI QIDQ4876357
Publication date: 13 October 1996
Published in: International Journal of Computer Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00207169508804404
Newton's methodnumerical experimentsiterative methodsevolution equationsprojection methodslarge scale problemsHopf bifurcation pointsnon-adiabatic tubular reactor
Iterative procedures involving nonlinear operators (47J25) Numerical solutions to equations with nonlinear operators (65J15) Variational problems in abstract bifurcation theory in infinite-dimensional spaces (58E07)
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Cites Work
- A quasi-Newton method for solving fixed point problems in Hilbert spaces
- An algorithm for the computation of Hopf bifurcation points in comparison with other methods
- A projection method for computing turning points of nonlinear equations
- The approximation of generalized turning points by Krylov subspace methods
- Numerical Computation of Hopf Bifurcation Points for Parabolic Diffusion-Reaction Differential Equations
- The Calculation of Hopf Points by a Direct Method
- A Direct Method for the Computation of Hopf Bifurcation Points
- Krylov-type methods for the computation of critical solutions of nonlinear equations
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