Best results in : Research Potential Pokaż wszystkie wyniki (2)
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Zespół Katedry Równań Różniczkowych i Zastosowań Matematyki
Research Potential* topologiczne niezmienniki w teorii układów dynamicznych i ich zastosowania * teoria punktów stałych i periodycznych * metody matematyczne w kardiologii * miary złożoności i ich zastosowania * modele strukturalne z dyfuzją i warunkami brzegowymi Fellera * modelowanie ekspresji genu białka Hes1 * równania McKendrick-von Foerster z warunkiem odnowy * modelowanie termicznej ablacji za pomocą równania bio-przewodnictwa ciepła * soczewkowanie...
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Zespół Katedry Analizy Nieliniowej i Statystyki
Research PotentialW Katedrze prowadzone są badania w trzech wiodących kierunkach. Pierwszy dotyczy zastosowania metod topologicznych i wariacyjnych w układach dynamicznych, w teorii równań różniczkowych zwyczajnych i cząstkowych oraz w teorii bifurkacji. Drugim kierunkiem badań Katedry jest zastosowanie rachunku prawdopodobieństwa i teorii aproksymacji. Ostatnią specjalizacją jest Geometria i Grafika Komputerowa, która istnieje od 2014 roku. Wybór...
Other results Pokaż wszystkie wyniki (8)
Search results for: DIFFEOMORPHISMS
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Periodic expansion in determining minimal sets of Lefschetz periods for Morse–Smale diffeomorphisms
PublicationWe apply the representation of Lefschetz numbers of iterates in the form of periodic expansion to determine the minimal sets of Lefschetz periods of Morse–Smale diffeomorphisms. Applying this approach we present an algorithmic method of finding the family of minimal sets of Lefschetz periods for Ng, a non-orientable compact surfaces without boundary of genus g. We also partially confirm the conjecture of Llibre and Sirvent (J Diff...
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Minimal Sets of Lefschetz Periods for Morse-Smale Diffeomorphisms of a Connected Sum of g Real Projective Planes
PublicationThe dataset titled Database of the minimal sets of Lefschetz periods for Morse-Smale diffeomorphisms of a connected sum of g real projective planes contains all of the values of the topological invariant called the minimal set of Lefschetz periods, computed for Morse-Smale diffeomorphisms of a non-orientable compact surface without boundary of genus g (i.e. a connected sum of g real projective planes), where g varies from 1 to...
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Database of the minimal sets of Lefschetz periods for Morse-Smale diffeomorphisms of a connected sum of g tori
Open Research DataMorse–Smale diffeomorphisms, structurally stable and having relatively simple dynamics, constitute an important subclass of diffeomorphisms that have been carefully studied during past decades. For a given Morse–Smale diffeomorphism one can consider “Minimal set of Lefschetz periods”, which provides the information about the set of periodic points of...
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Database of the minimal sets of Lefschetz periods for Morse-Smale diffeomorphisms of a connected sum of g real projective planes.
Open Research DataMorse–Smale diffeomorphisms, structurally stable and having relatively simple dynamics, constitute an important subclass of diffeomorphisms that were carefully studied during past decades. For a given Morse–Smale diffeomorphism one can consider “Minimal set of Lefschetz periods”, which provides the information about the set of periodic points of considered...
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Dynamics of Field Line Mappings in Magnetic Flux Tubes
PublicationWe study the topological constraints on the dynamics of magnetic field lines in flux tubes. Our approach is based on the application of the topological invariant: fixed point index. We consider periodic flux tubes and find various restrictions on the field lines that come from the sequence of fixed point indices of iterations. We also analyze the case of a tube with a cylindrical obstacle, deducing some special dynamical properties...