Add to ORKGIn this paper we consider a mixed boundary value problem for biharmonic equation of the Airy stress function which models a crack problem of a solid elastic plate. An iterative method for reducing the problem to a sequence of mixed problems for Poisson equations is proposed and investigated. The convergence of the method is established theoretically and illustrated on many numerical experiments
Abstract. We introduce a new mixed method for the biharmonic problem. The method is based on a formu...
Let Ω be a domain with piecewise smooth boundary. In general, it is impossible to obtain a generaliz...
We present a method of solution of a class of fracture problems in the theory of elasticity. The met...
The problem is to analyse the buckling effects of a flat plate, supported at a certain number of poi...
The problem is to analyse the buckling effects of a flat plate, supported at a certain number of poi...
In this work we present a finite element method for the biharmonicproblem based on the primal mixed ...
We propose a stabilized finite element method for the approximation of the biharmonic equation with ...
AbstractWe propose a stabilized finite element method for the approximation of the biharmonic equati...
This paper is concerned with weak solution of a mixed boundary value problem for the biharmonic equa...
We propose a stabilized finite element method for the approximation of the biharmonic equation with ...
AbstractThis paper is devoted to the introduction of a mixed finite element for the solution of the ...
In the present paper we study some properties of solutions of biharmonic problems. Namely, we study ...
The problem of existence of the solution is investigated for Poisson's equation inunbounded multi-la...
The problem of existence of the solution is investigated for Poisson's equation inunbounded multi-la...
We analyse some new aspects concerning application of the fundamental solution method to the basic t...
Abstract. We introduce a new mixed method for the biharmonic problem. The method is based on a formu...
Let Ω be a domain with piecewise smooth boundary. In general, it is impossible to obtain a generaliz...
We present a method of solution of a class of fracture problems in the theory of elasticity. The met...
The problem is to analyse the buckling effects of a flat plate, supported at a certain number of poi...
The problem is to analyse the buckling effects of a flat plate, supported at a certain number of poi...
In this work we present a finite element method for the biharmonicproblem based on the primal mixed ...
We propose a stabilized finite element method for the approximation of the biharmonic equation with ...
AbstractWe propose a stabilized finite element method for the approximation of the biharmonic equati...
This paper is concerned with weak solution of a mixed boundary value problem for the biharmonic equa...
We propose a stabilized finite element method for the approximation of the biharmonic equation with ...
AbstractThis paper is devoted to the introduction of a mixed finite element for the solution of the ...
In the present paper we study some properties of solutions of biharmonic problems. Namely, we study ...
The problem of existence of the solution is investigated for Poisson's equation inunbounded multi-la...
The problem of existence of the solution is investigated for Poisson's equation inunbounded multi-la...
We analyse some new aspects concerning application of the fundamental solution method to the basic t...
Abstract. We introduce a new mixed method for the biharmonic problem. The method is based on a formu...
Let Ω be a domain with piecewise smooth boundary. In general, it is impossible to obtain a generaliz...
We present a method of solution of a class of fracture problems in the theory of elasticity. The met...