Lidstone Fractal Interpolation and Error Analysis

Abstract

In the present paper, the notion of Lidstone Fractal Interpolation Function (Lidstone \ FIF) is introduced to interpolate and approximate data generating functions that arise from real life objects and outcomes of several scientific experiments. A Lidstone FIF extends the classical Lidstone Interpolation Function which is generally found not to be satisfactory in interpolation and approximation of such functions. For a data \(xn,yn,2k); n=0,1,…,N \ and \ k=0,1,…,p\ with N,p∈N, the existence of Lidstone FIF is proved in the present work and a computational method for its construction is developed. The constructed Lidstone FIF is a C2p[x0,xN] fractal function α satisfying α(2k)(xn)=yn,2k, n=0,1,…,N,\ k=0,1,…,p. Our error estimates establish that the order of L∞-error in approximation of a data generating function in C2p[x0,xN] by Lidstone FIF is of the order N-2p, while L∞-error in approximation of 2k-order derivative of the data generating function by corresponding order derivative of Lidstone FIF is of the order N-(2p-2k). The results found in the present work are illustrated for computational constructions of a Lidstone FIF and its derivatives with an example of a data generating function.