A New Class of Monotone/Convex Rational Fractal Function

Abstract

This paper presents a description and analysis of a rational cubic spline FIF (RCSFIF) that has two shape parameters in each subinterval when it is defined implicitly. To be precise, we consider the iterated function system (IFS) with qn=PnQn, n ∈ NN-1, where Pn(x) are cubic polynomials to be determined through interpolatory conditions of the corresponding FIF and Qn(x) are preassigned quadratic polynomials each containing two free shape/rationality parameters. We establish the convergence of the proposed RCSFIF g to the original function ∈ C3(I) with respect to the uniform norm. We also provide the sufficient conditions for an automatic selection of the rational IFS parameters to preserve monotonicity and convexity of a prescribed set of data points. We consider some examples to illustrate the developed fractal interpolation scheme and its shape preserving aspects.