Spline Interpolation and Wavelet Construction

In this paper, a semi-orthogonal cubic spline wavelet basis of homogeneous Sobolev space H 2 0 (I) is constructed, which turns out to be a basis of the continuous space C 0 (I). At the same time, the orthogonal projections on the wavelet subspaces in H 2 0 (I) are extended to the interpolating opera

We present a new family of biorthogonal wavelet and wavelet packet transforms for discrete periodic signals and a related library of biorthogonal periodic symmetric waveforms. The construction is based on the superconvergence property of the interpolatory polynomial splines of even degrees. The cons

In this paper we derive necessary optimality conditions for an interpolating spline function which minimizes the Holladay approximation of the energy functional and which stays monotone if the given interpolation data are monotone. To this end optimal control theory for state-restricted optimal cont

Periodic scaling functions and wavelets are constructed directly from non-stationary multiresolutions of \(L^{2}([0,2 \pi))\), the space of square-integrable \(2 \pi\)-periodic functions. For a multiresolution \(\left\{V_{k}: k \geqslant 0\right\}\), necessary and sufficient conditions for \(\cup_{k