Аннотации:
In this paper, we consider the homogenization problem in a micro inhomogeneous domain with a
rapidly oscillating boundary. It is assumed that a system of nonlinear reaction–diffusion equations
with rapidly oscillating terms and dissipation is considered in the domain. On the locally periodic
oscillating part of the boundary, the third boundary condition with rapidly oscillating coefficients
and a small parameter characterizing the oscillation of the boundary to some degree is imposed.
Depending on the degree of the small parameter in the boundary condition, various homogenized
(limit) problems are obtained and the convergence of the trajectory attractors of the given system
to the attractors of the homogenized system is proved. Critical, subcritical and supercritical cases
of attractor behavior as the small parameter tends to zero are carefully studied. The paper also
considers problems in a domain with a random rapidly oscillating boundary. In this case, a
homogenized system of reaction–diffusion equations with deterministic coefficients is obtained
in the case of a statistically homogeneous random structure of the boundary. A theorem on
the convergence of random trajectory attractors of the initial given system of reaction-diffusion
equations to a deterministic attractor of the homogenized (limit) system of reaction–diffusion
equations is also proved. The paper also proves the convergence of global attractors in the case
of uniqueness of solutions, which in turn is proved for nonlinearity in a system of equations of a
special type.
