Recursive Schemes for Scattered Data Interpolation via Bivariate Continued Fractions

In the paper,firstly,based on new non-tensor-product-typed partially inverse divided differences algorithms in a recursive form,scattered data interpolating schemes are constructed via bivariate continued fractions with odd and even nodes,respectively.And equivalent identities are also obtained between interpolated functions and bivariate continued fractions.Secondly,by means of three-term recurrence relations for continued fractions,the characterization theorem is presented to study on the degrees of the numerators and denominators of the interpolating continued fractions.Thirdly,some numerical examples show it feasible for the novel recursive schemes.Meanwhile,compared with the degrees of the numerators and denominators of bivariate Thiele-typed interpolating continued fractions,those of the new bivariate interpolating continued fractions are much low,respectively,due to the reduction of redundant interpolating nodes.Finally,the operation count for the rational function interpolation is smaller than that for radial basis function interpolation.