Interpolation on Curvilinear Schemes

Non-uniform multivariate subdivision schemes are constructed, which generate limit functions interpolating some of the initial control points. Our schemes differ from the known interpolatory subdivision schemes, in that only some of the original control points are interpolated, and not the control p

In this paper the weighted ENO (essentially non-oscillatory) scheme developed for the one-dimensional case by Liu, Osher, and Chan is applied to the case of unstructured triangular grids in two space dimensions. Ideas from Jiang and Shu, especially their new way of smoothness measuring, are consider

We obtain some characterizations of almost interpolation configurations of points with respect to finite-dimensional functional spaces. Particularly, a Schoenberg Whitney type characterization which is valid for any multivariate spline space relative to an arbitrary partition of a domain A/R m is pr