Morse–Smale system
Encyclopedia
In dynamical systems theory
, an area of applied mathematics, a Morse–Smale system is a smooth dynamical system whose non-wandering set consists of finitely many hyperbolic equilibrium point
s and hyperbolic
periodic orbits and satisfying a transversality condition on the stable
and unstable manifolds. Morse–Smale systems are structurally stable
and form one of the simplest and best studied classes of smooth dynamical systems. They are named after Marston Morse
, the creator of the Morse theory
, and Stephen Smale
, who emphasized their importance for smooth dynamics and algebraic topology
.
For Morse-Smale systems on 2D-sphere all equilibrium points and periodical orbits are hyperbolic
; there are no separatrice loops.
Gradient-like dynamical systems are particular case of Morse-Smale systems.
Theorem (Peixoto). The vector field on 2D manifold structurally stable only and only if this field is Morse-Smale.
Riemannian manifold
M defines a gradient vector field. If one imposes the condition that the unstable and stable
manifolds
of the critical point
s intersect transversely, then the gradient vector field and the corresponding smooth flow
form a Morse-Smale system. The finite set of critical point
s of f forms the non-wandering set, which consists entirely of fixed points.
Dynamical systems theory
Dynamical systems theory is an area of applied mathematics used to describe the behavior of complex dynamical systems, usually by employing differential equations or difference equations. When differential equations are employed, the theory is called continuous dynamical systems. When difference...
, an area of applied mathematics, a Morse–Smale system is a smooth dynamical system whose non-wandering set consists of finitely many hyperbolic equilibrium point
Hyperbolic equilibrium point
In the study of dynamical systems, a hyperbolic equilibrium point or hyperbolic fixed point is a fixed point that does not have any center manifolds. Near a hyperbolic point the orbits of a two-dimensional, non-dissipative system resemble hyperbolas. This fails to hold in general...
s and hyperbolic
Hyperbolic set
In dynamical systems theory, a subset Λ of a smooth manifold M is said to have a hyperbolic structure with respect to a smooth map f if its tangent bundle may be split into two invariant subbundles, one of which is contracting and the other is expanding under f, with respect to some...
periodic orbits and satisfying a transversality condition on the stable
Stable manifold
In mathematics, and in particular the study of dynamical systems, the idea of stable and unstable sets or stable and unstable manifolds give a formal mathematical definition to the general notions embodied in the idea of an attractor or repellor...
and unstable manifolds. Morse–Smale systems are structurally stable
Structural stability
In mathematics, structural stability is a fundamental property of a dynamical system which means that the qualitative behavior of the trajectories is unaffected by C1-small perturbations....
and form one of the simplest and best studied classes of smooth dynamical systems. They are named after Marston Morse
Marston Morse
Harold Calvin Marston Morse was an American mathematician best known for his work on the calculus of variations in the large, a subject where he introduced the technique of differential topology now known as Morse theory...
, the creator of the Morse theory
Morse theory
In differential topology, the techniques of Morse theory give a very direct way of analyzing the topology of a manifold by studying differentiable functions on that manifold. According to the basic insights of Marston Morse, a differentiable function on a manifold will, in a typical case, reflect...
, and Stephen Smale
Stephen Smale
Steven Smale a.k.a. Steve Smale, Stephen Smale is an American mathematician from Flint, Michigan. He was awarded the Fields Medal in 1966, and spent more than three decades on the mathematics faculty of the University of California, Berkeley .-Education and career:He entered the University of...
, who emphasized their importance for smooth dynamics and algebraic topology
Algebraic topology
Algebraic topology is a branch of mathematics which uses tools from abstract algebra to study topological spaces. The basic goal is to find algebraic invariants that classify topological spaces up to homeomorphism, though usually most classify up to homotopy equivalence.Although algebraic topology...
.
For Morse-Smale systems on 2D-sphere all equilibrium points and periodical orbits are hyperbolic
Hyperbolic point
In applied mathematics, a hyperbolic point in a system dx/dt = F of ordinary differential equations is a stationary point x0 such that the eigenvalues of the linearized system have non-zero real part.-See also:*Anticlastic...
; there are no separatrice loops.
Gradient-like dynamical systems are particular case of Morse-Smale systems.
Theorem (Peixoto). The vector field on 2D manifold structurally stable only and only if this field is Morse-Smale.
Examples
Any Morse function f on a compactCompact space
In mathematics, specifically general topology and metric topology, a compact space is an abstract mathematical space whose topology has the compactness property, which has many important implications not valid in general spaces...
Riemannian manifold
Riemannian manifold
In Riemannian geometry and the differential geometry of surfaces, a Riemannian manifold or Riemannian space is a real differentiable manifold M in which each tangent space is equipped with an inner product g, a Riemannian metric, which varies smoothly from point to point...
M defines a gradient vector field. If one imposes the condition that the unstable and stable
Stable manifold
In mathematics, and in particular the study of dynamical systems, the idea of stable and unstable sets or stable and unstable manifolds give a formal mathematical definition to the general notions embodied in the idea of an attractor or repellor...
manifolds
Manifold
In mathematics , a manifold is a topological space that on a small enough scale resembles the Euclidean space of a specific dimension, called the dimension of the manifold....
of the critical point
Critical point (mathematics)
In calculus, a critical point of a function of a real variable is any value in the domain where either the function is not differentiable or its derivative is 0. The value of the function at a critical point is a critical value of the function...
s intersect transversely, then the gradient vector field and the corresponding smooth flow
Flow (mathematics)
In mathematics, a flow formalizes the idea of the motion of particles in a fluid. Flows are ubiquitous in science, including engineering and physics. The notion of flow is basic to the study of ordinary differential equations. Informally, a flow may be viewed as a continuous motion of points over...
form a Morse-Smale system. The finite set of critical point
Critical point (mathematics)
In calculus, a critical point of a function of a real variable is any value in the domain where either the function is not differentiable or its derivative is 0. The value of the function at a critical point is a critical value of the function...
s of f forms the non-wandering set, which consists entirely of fixed points.