Abstract: In this paper, using the concept of statistical -convergence which is stronger than statistical convergence, we obtain a statistical approximation theorem for a general sequence of max-product operators, including Shepard type operators, although its classical limit fails. We also compute the corresponding statistical rates of the approximation. [Copyright &y& Elsevier]
Abstract: In the present paper, static and dynamical problems for linearly elastic shells in curvilinear coordinates are considered. Hierarchies of two-dimensional models for corresponding boundary and initial boundary value problems are constructed within the variational settings. The existence and uniqueness of solutions of the reduced problems are investigated in suitable spaces. Under the conditions of solvability of the original static or dynamical problem, convergence of the sequence of vector functions of three variables restored from the solutions of the constructed two-dimensional problems to the solution of the three-dimensional problem is proved and approximation error is estimated. [Copyright &y& Elsevier]
In this paper, we develop a numerical approximation to the solution of a system of integral equations arising from a nonlocal hyperbolic reliability model. Convergence of this numerical method is proved. And this numerical scheme is used to study the behavior of the solution. [Copyright &y& Elsevier]