General order Newton-Padé approximants for multivariate functions

The notion of partial Padé approximant is generalized to that of general order multivariate partial Newton-Padé approximant. Previously introduced multivariate Padé-type approximants are recaptured as special cases so that it is a true and unifying generalization. The last section contains numerical

A new definition of multivariate Pade approximation is introduced, which is a natural generalization of the univariate Pade approximation and consists in replacing the exact interpolation problem by a least squares interpolation. This new definition allows a straightforward extension of the Montessu

In previous papers the convergence of sequences of ``rectangular'' multivariate Pade -type approximants was studied. In other publications definitions of ``triangular'' multivariate Pade -type approximants were given. We extend these results to the general order definition where the choice of the de

We explicitly construct non-homogeneous multivariate Pade approximants to some functions like q &(i+ j) 2 Â2 x i y j , and E(x, y) := : i, j=0 x i y j [i+ j] q ! , which satisfy some functional equations, where |q|>1, q # C.