Mean approximation by polynomials on a Jordan curve

It is shown, within Bishop's constructive mathematics, that if a point is sufficiently close to a differentiable Jordan curve with suitably restricted curvature, then that point has a unique closest point on the curve.

By establishing an identity for \(S_{n}(x):=\sum_{j=0}^{n}|j / n-x|\left({ }_{j}^{n}\right) x^{j}(1-x)^{n-j}\), the present paper shows that a pointwise asymptotic estimate cannot hold for \(S_{n}(x)\), and, at the same time, obtains a better result than that in Bojanic and Cheng [3]. 1993 Academic

Ahdrae-A geueral method for the numerical solution of the singular integral equation describing the curved crack problem is presented. The basic idea is the approximation of the dislocation function by a polynomial divided by a weight function. Combined with the collocation method this leads to a si