Poincare Model
Mostrando 13-17 de 17 artigos, teses e dissertações.
-
13. Orbitas periodicas em conjuntos homoclinicos a um parametro
In this work we calculate numerically, some important structures present in the generic bifurcation of a periodic orbits of a Hamiltonian systems with stability angle of 2p . These structures are the fixed points, the separatrices and the periodic orbits of the associated Poincaré map. The map which describes this situation, known as Meyer s Map, was found
Publicado em: 1993
-
14. A Biological Least-Action Principle for the Ecological Model of Volterra-Lotka
The conservative model of Volterra for more-than-two predator-prey species is shown to be generated as extremals that minimize a definable Lagrange-Hamilton integral involving half the species and their rates of change. This least-action formulation differs from that derived two generations ago by Volterra, since his involves twice the number of phase variab
-
15. Microscopic theory of irreversible processes
The microscopic theory of irreversible processes that we developed is summarized and illustrated, using as a simple example the Friedrichs model. Our approach combines the Poincaré's point of view (dynamical interpretation of irreversibility) with the Gibbs-Einstein ensemble point of view. It essentially consists in a nonunitary transformation theory based
-
16. A nonrandom dynamic component in the synaptic noise of a central neuron
Continuous segments of synaptic noise were recorded in vivo from teleost Mauthner cells and were studied with the methods of nonlinear analysis. As in many central neurons, this ongoing activity is dominated by consecutive inhibitory postsynaptic potentials. Recurrence plots and first or third order Poincaré maps combined with surrogate shuffling revealed n
The National Academy of Sciences of the USA.
-
17. Geometric visual hallucinations, Euclidean symmetry and the functional architecture of striate cortex.
This paper is concerned with a striking visual experience: that of seeing geometric visual hallucinations. Hallucinatory images were classified by Klüver into four groups called form constants comprising (i) gratings, lattices, fretworks, filigrees, honeycombs and chequer-boards, (ii) cobwebs, (iii) tunnels, funnels, alleys, cones and vessels, and (iv) spir