Search for dissertations about: "Ergodicity"

Showing result 1 - 5 of 15 swedish dissertations containing the word Ergodicity.

  2. 1. Non-linearizability, unique ergodicity and weak mixing in dynamics

    Author : Maria Saprykina; KTH; []
    Keywords : NATURVETENSKAP; NATURAL SCIENCES; Ergodicity; weak mixing; Hamiltonian systems; MATHEMATICS; MATEMATIK;

    Abstract : .... READ MORE

  4. 2. Study of ergodicity of p-adic dynamical systems with the aid of van der Put basis

    Author : Ekaterina Yurova; Andrei Khrennikov; Valery Maksimov; Linnéuniversitetet; []
    Keywords : NATURVETENSKAP; NATURAL SCIENCES; p-adic numbers; van der Put basis; 1-Lipschitz; measure-preserving; ergodicity; sphere; T-function; Tillämpad matematik; Applied Mathematics;

    Abstract : The study of p-adic dynamical systems is motivated by their applications in various (and surprisingly diverse) areas of mathematics, e.g., in physics, genetics, biology, cognitive science, neurophysiology, computer science, cryptology, etc. READ MORE

  5. 3. Narrowing the gap between network models and real complex systems

    Author : Alcides Viamontes Esquivel; Martin Rosvall; Joachim Mathiesen; Umeå universitet; []
    Keywords : NATURVETENSKAP; NATURAL SCIENCES; complex systems; network science; community detection; model selection; signficance analysis; ergodicity; fysik; Physics;

    Abstract : Simple network models that focus only on graph topology or, at best, basic interactions are often insufficient to capture all the aspects of a dynamic complex system. In this thesis, I explore those limitations, and some concrete methods of resolving them. READ MORE

  6. 4. P-adic dynamical systems and van der Put basis technique

    Author : Ekaterina Yurova Axelsson; Andrei Khrennikov; Franco Vivaldi; Linnéuniversitetet; []
    Keywords : NATURVETENSKAP; NATURAL SCIENCES; dynamical systems; p-adic; 1-Lipschitz; measure-preserving; ergodicity; spheres; uniformly differentiable; Tillämpad matematik; Applied Mathematics;

    Abstract : Theory of dynamical systems in fields of p-adic numbers is  an important part of algebraic and arithmetic dynamics. The study of p-adic dynamical systems is motivated by their applications in various areas of mathematics, e.g., in physics, genetics, biology, cognitive science, neurophysiology, computer science, cryptology, etc. READ MORE

  7. 5. Molecular Quantum Dynamics - Ergodicity, Energy Transfer and Dissociation

    Author : Andreas Bäck; Göteborgs universitet; []
    Keywords : NATURVETENSKAP; NATURAL SCIENCES;

    Abstract : .... READ MORE