Selecting the optimal Parameters Results in Double Interpolation: Double AFD

Abstract

Let f belong to the Hardy space H2(D) of the unit disc, and ea the normalized Szeg\"o (reproducing) kernel of H2(D). It is well known that, due to the reproducing kernel property, for any distinct n points a1,·s,an in D the orthogonal projection of f into span\ea1,·s,ean\, denoted as P span\ea1,·s,ean\(f), interpolates f at the points ak's. The present study further proves that if the ak's are optimally selected according to certain energy matching pursuit principle, then P span\ea1,·s,ean\(f) double interpolates f at the points ak's, or order m=2 interpolation, that is, \[ P span\ea1,·s,ean\(f)(ak)=f(ak), and P span\ea1,·s,ean\'(f)(ak)=f'(ak), k=1,·s,n.\] With the accordingly newly defined double Takenaka-Malmquist system, the norm convergence for n ∞, the n-best approximation for n being fixed, and the related boundary function interpolation are studied. The such generated new sparse representation, named as double AFD, is shown to outperform the classical AFD. Pointwise interpolations for orders m>2, meaning to simultaneously interpolates all functions f,f',·s,f(m-1) at a set of ak's are, additionally, discussed. For the Hardy space of the upper-half complex plane there exists a counterpart theory.