AbstractNonlinear equations with parameters are called parametrized nonlinear equations. In this paper, a priori error estimates of finite element solutions of parametrized nonlinear elliptic equations on branches around turning points are considered. Existence of a finite element solution branch is shown under suitable conditions on an exact solution branch around a turning point. Also, some error estimates of distance between exact and finite element solution branches are given. It is shown that error of a parameter is much smaller than that of functions. Approximation of nondegenerate turning points is also considered. We show that if a turning point is nondegenerate, there exists a locally unique finite element nondegenerate turning poi...
summary:In contradistinction to former results, the error bounds introduced in this paper are given ...
Abstract. Nonlinear boundary value problems (NBVPs in abbreviation) with pa-rameters are called para...
summary:This paper is concerned with the analysis of the finite element method for the numerical sol...
AbstractNonlinear boundary value problems with parameters are called parametrized nonlinear boundary...
The effect of numerical quadrature in finite element methods for solving quasilinear elliptic proble...
The effect of numerical integration in the finite element method for nonmonotone nonlinear elliptic ...
When a boundary value problem has a classical solution, then the finite element error function is d...
A finite element method with numerical quadrature is considered for the solution of a class of secon...
AbstractIn this paper, we discuss with guaranteed a priori and a posteriori error estimates of finit...
AbstractIn this note we derive optimal error estimates for finite element approximations of a restri...
In [13], a nonlinear elliptic equation arising from elastic-plastic mechanics is studied. A well-pos...
Abstract. We establish pointwise andW−1 ∞ estimates for finite element meth-ods for a class of secon...
Abstract. We establish pointwise and W −1 ∞ estimates for finite element methods for a class of seco...
AbstractNumerical verification methods, so-called Nakao's methods, on existence or uniqueness of sol...
summary:The paper is concerned with the study of an elliptic boundary value problem with a nonlinear...
summary:In contradistinction to former results, the error bounds introduced in this paper are given ...
Abstract. Nonlinear boundary value problems (NBVPs in abbreviation) with pa-rameters are called para...
summary:This paper is concerned with the analysis of the finite element method for the numerical sol...
AbstractNonlinear boundary value problems with parameters are called parametrized nonlinear boundary...
The effect of numerical quadrature in finite element methods for solving quasilinear elliptic proble...
The effect of numerical integration in the finite element method for nonmonotone nonlinear elliptic ...
When a boundary value problem has a classical solution, then the finite element error function is d...
A finite element method with numerical quadrature is considered for the solution of a class of secon...
AbstractIn this paper, we discuss with guaranteed a priori and a posteriori error estimates of finit...
AbstractIn this note we derive optimal error estimates for finite element approximations of a restri...
In [13], a nonlinear elliptic equation arising from elastic-plastic mechanics is studied. A well-pos...
Abstract. We establish pointwise andW−1 ∞ estimates for finite element meth-ods for a class of secon...
Abstract. We establish pointwise and W −1 ∞ estimates for finite element methods for a class of seco...
AbstractNumerical verification methods, so-called Nakao's methods, on existence or uniqueness of sol...
summary:The paper is concerned with the study of an elliptic boundary value problem with a nonlinear...
summary:In contradistinction to former results, the error bounds introduced in this paper are given ...
Abstract. Nonlinear boundary value problems (NBVPs in abbreviation) with pa-rameters are called para...
summary:This paper is concerned with the analysis of the finite element method for the numerical sol...