Vector valued rational interpolants I.

Bivariate rational interpolating functions of the type introduced in [9, l] are shown to have a natural extension to the case of rational interpolation of vector-valued quantities using the formalism of Graves-Morris [Z]. In this paper, the convergence of Stieltjes-type branched vector-valued contin

A new method for the construction of bivariate matrix-valued rational interpolants on a rectangular grid is introduced in this paper. The rational interpolants are of the continued fraction form, with scalar denominator. In this respect the approach is essentially different from that of where a ra

In this paper, by deÿning a kind of transformation from matrix to vector, we succeed in transferring some results on vector-valued rational interpolants to those corresponding to the matrix-valued rational interpolants. Moreover, it is pointed out through a numerical example that the statement of th