On global dynamics of type-K competitive Kolmogorov differential systems
From MaRDI portal
Publication:6100662
DOI10.1088/1361-6544/acda77zbMath1521.37026MaRDI QIDQ6100662
Publication date: 22 June 2023
Published in: Nonlinearity (Search for Journal in Brave)
global attractorinvariant manifoldcarrying simplexglobal asymptotic behaviourtype-\(K\) competitive Kolmogorov system
Attractors and repellers of smooth dynamical systems and their topological structure (37C70) Global stability of solutions to ordinary differential equations (34D23) Invariant manifolds for ordinary differential equations (34C45) Stability theory for smooth dynamical systems (37C75) Symmetries and invariants of dynamical systems (37C79)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- On heteroclinic cycles of competitive maps via carrying simplices
- Heteroclinic limit cycles in competitive Kolmogorov systems
- On the equivalent classification of three-dimensional competitive Leslie/Gower models via the boundary dynamics on the carrying simplex
- Global stability of interior and boundary fixed points for Lotka-Volterra systems
- Systems of differential equations that are competitive or cooperative. V: Convergence in 3-dimensional systems
- Smoothness of the carrying simplex for discrete-time competitive dynamical systems: A characterization of neat embedding
- Geometric method for a global repellor in competitive Lotka-Volterra systems
- The \(C^ 1\) property of carrying simplices for a class of competitive systems of ODEs
- The coexistence of a community of species with limited competition
- The classification of the dynamical behavior of 3-dimensional type K monotone Lotka-Volterra systems
- On the convexity of the carrying simplex of planar Lotka-Volterra competitive systems.
- Uniqueness and attractivity of the carrying simplex for discrete-time competitive dynamical systems
- Heteroclinic orbits and convergence of order-preserving set-condensing semiflows with applications to integrodifferential equations
- Lotka-Volterra and related systems. Recent developments in population dynamics
- Global stability and repulsion in autonomous Kolmogorov systems
- Global stability of Gompertz model of three competing populations
- On the validity of Zeeman's classification for three dimensional competitive differential equations with linearly determined nullclines
- On the complete classification of nullcline stable competitive three-dimensional Gompertz models
- Convex geometry of the carrying simplex for the May-Leonard map
- Convexity of the carrying simplex for discrete-time planar competitive Kolmogorov systems
- THE DYNAMICAL BEHAVIOR ON THE CARRYING SIMPLEX OF A THREE-DIMENSIONAL COMPETITIVE SYSTEM: II. HYPERBOLIC STRUCTURE SATURATION
- Fixed point global attractors and repellors in competitive Lotka–Volterra systems
- Convexity-preserving flows of totally competitive planar Lotka–Volterra equations and the geometry of the carrying simplex
- On existence and uniqueness of the carrying simplex for competitive dynamical systems
- On the Asymptotic Behavior of a Class of Deterministic Models of Cooperating Species
- Competing Subcommunities of Mutualists and a Generalized Kamke Theorem
- Systems of Differential Equations that are Competitive or Cooperative II: Convergence Almost Everywhere
- Systems of differential equations which are competitive or cooperative: III. Competing species
- On peaks in carrying simplices
- Systems of Differential Equations Which Are Competitive or Cooperative: I. Limit Sets
- On smoothness of carrying simplices
- Hopf bifurcations in competitive three-dimensional Lotka–Volterra systems
- Stability and transient behavior of composite nonlinear systems
- The dynamical behaviour of type-K competitive Kolmogorov systems and its application to three-dimensional type-K competitive Lotka Volterra systems
- From local to global behavior in competitive Lotka-Volterra systems
- Exclusion and dominance in discrete population models via the carrying simplex
- Geometry of carrying simplices of 3-species competitive Lotka–Volterra systems
- On existence and uniqueness of a modified carrying simplex for discrete Kolmogorov systems
- On existence and uniqueness of a carrying simplex in Kolmogorov differential systems
- Permanence criteria for Kolmogorov systems with delays
- The theorem of the carrying simplex for competitive system defined on the n-rectangle and its application to a three-dimensional system
- Geometric method for global stability and repulsion in Kolmogorov systems
- The general properties of dicrete-time competitive dynamical systems
- Kolmogorov vector fields with robustly permanent subsystems
This page was built for publication: On global dynamics of type-K competitive Kolmogorov differential systems
