Periodic trajectories in planar discontinuous piecewise linear systems with only centers and with a nonregular switching line
出版年份 2023 全文链接
标题
Periodic trajectories in planar discontinuous piecewise linear systems with only centers and with a nonregular switching line
作者
关键词
-
出版物
NONLINEARITY
Volume 36, Issue 12, Pages 6747-6776
出版商
IOP Publishing
发表日期
2023-11-01
DOI
10.1088/1361-6544/ad03a7
参考文献
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注意:仅列出部分参考文献,下载原文获取全部文献信息。- Limit Cycles in Discontinuous Planar Piecewise Linear Systems Separated by a Nonregular Line of Center–Center Type
- (2021) Qianqian Zhao et al. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS
- The Extended 16th Hilbert Problem for Discontinuous Piecewise Linear Centers Separated by a Nonregular Line
- (2021) Marina Esteban et al. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS
- Limit Cycles in a Family of Planar Piecewise Linear Differential Systems with a Nonregular Separation Line
- (2019) Song-Mei Huan et al. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS
- Poincaré Maps of “
- (2019) Qianqian Zhao et al. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS
- Limit cycles for discontinuous planar piecewise linear differential systems separated by one straight line and having a center
- (2018) Jaume Llibre et al. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS
- On Poincaré-Bendixson Theorem and non-trivial minimal sets in planar nonsmooth vector fields
- (2018) Claudio A. Buzzi et al. PUBLICACIONS MATEMATIQUES
- On extended Chebyshev systems with positive accuracy
- (2017) Douglas D. Novaes et al. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS
- Piecewise linear differential systems with only centers can create limit cycles?
- (2017) Jaume Llibre et al. NONLINEAR DYNAMICS
- Periodic orbits for a discontinuous vector field arising from a conceptual model of glacial cycles
- (2016) James Walsh et al. NONLINEARITY
- Limit cycles in planar piecewise linear differential systems with nonregular separation line
- (2016) Pedro Toniol Cardin et al. PHYSICA D-NONLINEAR PHENOMENA
- Jump bifurcations in some degenerate planar piecewise linear differential systems with three zones
- (2016) Rodrigo Euzébio et al. PHYSICA D-NONLINEAR PHENOMENA
- Noose Structure and Bifurcations of Periodic Orbits in Reversible Three-Dimensional Piecewise Linear Differential Systems
- (2015) V. Carmona et al. JOURNAL OF NONLINEAR SCIENCE
- Stochastic Perturbations of Periodic Orbits with Sliding
- (2015) D. J. W. Simpson et al. JOURNAL OF NONLINEAR SCIENCE
- A general mechanism to generate three limit cycles in planar Filippov systems with two zones
- (2014) Emilio Freire et al. NONLINEAR DYNAMICS
- Noose bifurcation and crossing tangency in reversible piecewise linear systems
- (2014) V Carmona et al. NONLINEARITY
- Piecewise linear perturbations of a linear center
- (2013) Claudio Buzzi et al. DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS
- On the existence and uniqueness of limit cycles in planar continuous piecewise linear systems without symmetry
- (2013) Jaume Llibre et al. NONLINEAR ANALYSIS-REAL WORLD APPLICATIONS
- Limit cycles in a family of discontinuous piecewise linear differential systems with two zones in the plane
- (2013) Denis de Carvalho Braga et al. NONLINEAR DYNAMICS
- On the number of limit cycles in general planar piecewise linear systems
- (2012) Song-Mei Huan et al. DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS
- PIECEWISE SMOOTH REVERSIBLE DYNAMICAL SYSTEMS AT A TWO-FOLD SINGULARITY
- (2012) A. JACQUEMARD et al. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS
- Canonical Discontinuous Planar Piecewise Linear Systems
- (2012) Emilio Freire et al. SIAM JOURNAL ON APPLIED DYNAMICAL SYSTEMS
- Generic bifurcations of low codimension of planar Filippov Systems
- (2010) M. Guardia et al. JOURNAL OF DIFFERENTIAL EQUATIONS
- On Hopf bifurcation in non-smooth planar systems
- (2009) Maoan Han et al. JOURNAL OF DIFFERENTIAL EQUATIONS
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