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Global phase portraits of planar autonomous half-linear systems (Functional Equations and Complex Systems)openaire
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Global Phase Portraits of Ordinary Differential Equations Modeling the Acute Promyelocytic Leukemia
Differential Equations and Dynamical Systems, 2023zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Candido, Douglas Modesto +2 more
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Global Phase Portraits of Memristor Oscillators
International Journal of Bifurcation and Chaos, 2014In this paper, the global dynamics of memristor oscillators are investigated. For the sake of analysis, we first reformulate the original system into a simple form, which has only three parameters, and analyze its dynamics according to the variation of the parameters.
Chen, Hebai, Li, Xuefang
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Global phase portraits of planar piecewise linear refracting systems of saddle–saddle type
Nonlinear Analysis: Real World Applications, 2021zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yi Shao, Shimin Li, Kuilin Wu
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The Classification on the Global Phase Portraits of Two-dimensional Lotka–Volterra System
Journal of Dynamics and Differential Equations, 2008The authors present a complete classification of all quadratic planar Lotka-Volterra systems. By a very detailed investigation, they find 143 topologically inequivalent global phase portraits for these systems, up to time reversal. First, all systems with nontrivial closed orbits are examined separately.
Cao, Feng, Jiang, Jifa
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Global Phase Portraits of Separable Polynomial Rigid Systems with a Center
Journal of Nonlinear ScienceThe article studies separable polynomial rigid systems of the form \[ \dot{x} = -y + xH(x,y), \quad \dot{y} = x + yH(x,y), \] with \(H(x,y) = f(x)g(y)\), focusing on the case when either \(f\) or \(g\) is an odd function. This condition guarantees symmetry in the vector field, ensuring that the origin is a center and influencing the global dynamics ...
Chen, Hebai, Feng, Zhaosheng, Zhang, Rui
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Qualitative Theory of Dynamical Systems, 2016
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Qiu, Bao Hua, Liang, Hai Hua
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Qiu, Bao Hua, Liang, Hai Hua
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A complete global phase portrait for the matrix Riccati equation
The 22nd IEEE Conference on Decision and Control, 1983A complete description is given for the phase portrait of the matrix Riccati equation which arises from the optimal control and filtering problems, as well as for associated differential equations on the Grassmann and Lagrange-Grassmann manifolds. The phase portraits are characterized topologically as well as set-theoretically.
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Global phase portraits of the planar perpendicular problem of two fixed centers
Journal of Mathematical Physics, 2009We study the global phase portrait of the classical problem of an electron in the electrostatic field of two protons that we assume fixed to symmetric distances on the x3 axis. The general problem can be formulated as an integrable Hamiltonian system of three degrees of freedom, but we restrict our study to the invariant planar case that is equidistant
Jiménez Lara, Lidia +2 more
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Global Phase Portraits for a Planar ℤ2-Equivariant Kukles Systems of Degree 3
International Journal of Bifurcation and Chaos, 2020We provide normal forms and the global phase portraits on the Poincaré disk of all planar Kukles systems of degree [Formula: see text] with [Formula: see text]-equivariant symmetry. Moreover, we also provide the bifurcation diagrams for these global phase portraits.
Fabio Scalco Dias +2 more
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