Synchronising hyperchaos in infinite-dimensional dynamical systems

## Abstract This paper is devoted to the problem of chaotic behaviour of infinite‐dimensional dynamical systems. We give a survey of different approaches to study of chaotic behaviour of dynamical systems. We mainly discuss the ergodic‐theoretical approach to chaos which bases on the existence of i

Necessary conditions to create hyperchaos in a dynamical system are discussed. Three exampies exhibiting hyperchaos in electronic circuits with only one active element are described. The first is the modified Matsumoto-Chua-Kobayashi oscillator and the two others are the fourth order oscillators wit

General homotopy continuation and bifurcation results are proved for a class of semiflows. These results are applied to ordinary differential equations and to systems of reaction-diffusion equations.

we show that the problem of solving a certain class of time dependent variational inequalities is equivalent to the one of finding the stationary solutions of a related class of constrained dynamical systems. We exploit this equivalence to analyse the time dependent complementary problem.