The paper aims to obtain new local/global error bounds for quasi variational inequality problems in terms of the regularized gap function and the D-gap function. These bounds provide effective estimated distances between a specific point and the exact solution of quasi variational inequality problem.
Abstract. This paper describes a one-step method based upon the Lobatto four-point quadrature formula for the numerical integration of differential equation:The method has a local truncation error 0(h 6 ) in yix) and 0(/i 5 ) in y'(x). In the case of linear second-order differential equation, a stability criterion has been developed. Theoretical and computational comparisons of the new method with existing method is discussed.
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