Geometric methods in rational interpolation theory

To interpolate function, f(x), a 6 x 6 b, when we have some information about the values of f(x) and their derivatives in separate points on {x 0 , x 1 , . . . , x n } & [a, b], the Hermit interpolation method is usually used. Here, to solve this kind of problems, extended rational interpolation met

The problem of unattainable points is typical for the case of rational interpolation. Having computed the rational interpolant \(p / q\) from "linearized" interpolation conditions, in other words, conditions expressed for \(f q-p\) instead of for \(f-(p / q)\), it may occur that an interpolation poi

In this paper, two theorems determine the locus B ('buoyancy locus') of the centre of gravity of the displaced water of a ship with any number of 2n sides, as a function of the arbitrary continuous curves that make up those sides, and that generalize the classical wall-sided case (n = 1). Although t