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Quasimonotone Systems of Parabilic Equations, The Basic Setup, Maximum Principles, Positively Invariant Sets, Comparison and Monotonicity, The Strong Order Preserving Property

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WeekCourse ContentCourse Video
Review on General Dynamical SystemWatch Online
Monotone Dynamical System
Definitions
Monotone
Strongly monotone
Strongly order preserving (SOP)		Watch Online
Hirsch’s Convergence Theorem
No attracting periodic orbit in monotone system 		Watch Online
Non-ordering of limit sets
Limit set dichotomy
Generic quasi-convergence 		Watch Online
Competitive and Cooperative Differential Equations
Kamke Condition		Watch Online
Positively invariant sets and Monotone Solutions
Non-oscillation principle 		Watch Online
Topological Equivalence of flow of competitive or cooperative n-d systems to a flow on (n-1)-d system of Lipschitz differential equationsWatch Online
Poincare-Bendixson Theorem of 3-d competitive systems
Alternative Cones
The Field-Noyes Model 		Watch Online
Strong Monotonicity
A Biochemical Control Circuit
Stability and the Perron-Frobenius Theorem 		Watch Online
Irreducible Cooperative Systems
Competition and Migration
Smale’s Construction		Watch Online
Quasimonotone Systems of Parabilic Equations
The Basic Setup, Maximum Principles
Positively Invariant Sets
Comparison and Monotonicity
The Strong Order Preserving Property 		Watch Online
Irreducible Cooperative Systems
A Biochemical Control Circuit
Two Patch Competitive Models		Watch Online
Quasimonotone Systems of Parabilic Equations
The Basic Setup
Strong Parabilic Maximum Principles		Watch Online
Comparison Principle
Krein-Rutman Theorem
Weak Maximum Principle
Positively Invariant Sets
Comparison and Monotonicity		Watch Online
Krein-Rutman Theorem
Reaction-Diffusion system
Principle eigenvalue
Two species competition in the flow reactor model 		Watch Online
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