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This paper is further concerned with the finite-time generalized outer synchronization between two different dimensional chaotic systems with noise perturbation via an adaptive controller. First of all, we introduce the definition of finite-time generalized outer synchronization between two different dimensional chaotic systems. Then, employing the finite-time stability theory, we design an adaptive feedback controller to realize the generalized outer synchronization between two different dimensional...
A new class of controlled time-varying complex dynamical networks with similarity is investigated and a decentralized holographic-structure controller is designed to stabilize the network asymptotically at its equilibrium states. The control design is based on the similarity assumption for isolated node dynamics and the topological structure of the overall network. Network synchronization problems, both locally and globally, are considered on the ground of decentralized control approach. Each sub-controller...
In this paper, the finite-time stochastic outer synchronization and generalized outer synchronization between two complex dynamic networks with time delay and noise perturbation are studied. Based on the finite-time stability theory, sufficient conditions for the finite-time outer synchronization are obtained. Numerical examples are examined to illustrate the effectiveness of the analytical results. The effect of time delay and noise perturbation on the convergence time are also numerically demonstrated....
We consider the number of trophic levels in a food chain given by the
equilibrium state for a simple mathematical model with ordinary differential
equations which govern the temporal variation of the energy reserve in each
trophic level. When a new trophic level invades over the top of the chain,
the chain could lengthen by one trophic level.
We can derive the condition that such lengthening could
occur, and prove that the possibly longest chain is globally stable.
In some specific cases,...
With a reaction-diffusion system, we consider the dispersing two-species
Lotka-Volterra model with a temporally periodic interruption of the interspecific
competitive relationship. We assume that the competition coefficient becomes a given
positive constant and zero by turns periodically in time. We investigate the condition
for the coexistence of two competing species in space, especially in the bistable case
for the population dynamics without dispersion. We could find that the spatial coexistence,...
When a permanent magnet is released above a superconductor, it is levitated. This is due to the Meissner-effect, i.e. the repulsion of external magnetic fields within the superconductor. In experiments, an interesting behavior of the levitated magnet can be observed: it might start to oscillate with increasing amplitude and some magnets even reach a continuous rotation. In this paper we develop a mathematical model for this effect and identify by analytical methods as well with finite element simulations...
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