The structure of stationary states of the one-dimensional Cahn - Hilliard equation coupled with the Neumann boundary conditions has been studied. Here the free energy is given by a fourth order polynomial. The bifurcation diagram for existence and uniqueness of monotone solutions for this problem has been constructed. Namely, we find the length of the interval on which the solution monotonically increases or decreases and has one zero for some fixed values of physical parameters. Under the non-uniqueness we understand a possibility of existence of more than one monotone solutions for the same values of physical parameters.Исследована структура стационарного состояния одномерного уравнения Кана - Хилларда в сочетании с граничными условиями Н...
The evolution of the free surface of the ltering uid in a reservoir of limited power is modeled by t...
For the numerical solution of the Fredholm equation of the second kind with nondegenerate kernel by...
The article is devoted to the analysis of the scientific approach to the formation and development o...
The structure of stationary states of the one-dimensional Cahn - Hilliard equation coupled with the ...
The pure or viscous Cahn - Hilliard equation with possibly singular potentials and dynamic boundary ...
A boundary value problem for the heat equation is studied. It consists of recovering a function, sat...
We study the Dirichlet problem in a bounded plane domain for the heat equation with small parameter ...
We consider a model case of stationary vibrations of a thin flat plate, one side of which is embedde...
The Navier - Stokes system models the dynamics of a viscous incompressible fluid. The problem of exi...
Calculations of the size of wire rod and appropriate parameters for forming profiled rolling process...
The 2D perfect fluid motions equations in Lagrangian coordinates are considered. If body forces are ...
In this research the destruction mechanism of multilayer material on base of steels is studied by fi...
When trying to extend the Hodge theory for elliptic complexes on compact closed manifolds to the cas...
Исследуется задача Дирихле для линейного неоднородного эллиптического уравнения второго порядка, с м...
The differential equation for speed of the anchovy food taxis is derived. This equation is included ...
The evolution of the free surface of the ltering uid in a reservoir of limited power is modeled by t...
For the numerical solution of the Fredholm equation of the second kind with nondegenerate kernel by...
The article is devoted to the analysis of the scientific approach to the formation and development o...
The structure of stationary states of the one-dimensional Cahn - Hilliard equation coupled with the ...
The pure or viscous Cahn - Hilliard equation with possibly singular potentials and dynamic boundary ...
A boundary value problem for the heat equation is studied. It consists of recovering a function, sat...
We study the Dirichlet problem in a bounded plane domain for the heat equation with small parameter ...
We consider a model case of stationary vibrations of a thin flat plate, one side of which is embedde...
The Navier - Stokes system models the dynamics of a viscous incompressible fluid. The problem of exi...
Calculations of the size of wire rod and appropriate parameters for forming profiled rolling process...
The 2D perfect fluid motions equations in Lagrangian coordinates are considered. If body forces are ...
In this research the destruction mechanism of multilayer material on base of steels is studied by fi...
When trying to extend the Hodge theory for elliptic complexes on compact closed manifolds to the cas...
Исследуется задача Дирихле для линейного неоднородного эллиптического уравнения второго порядка, с м...
The differential equation for speed of the anchovy food taxis is derived. This equation is included ...
The evolution of the free surface of the ltering uid in a reservoir of limited power is modeled by t...
For the numerical solution of the Fredholm equation of the second kind with nondegenerate kernel by...
The article is devoted to the analysis of the scientific approach to the formation and development o...