Approximate Wavelets and the Approximation of Pseudodifferential Operators

## Abstract We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on anisotropic Gaussians and approximate wavelets. These formulas can be used to construct accurate cubature formulas for these potentials. (© 2007 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

We investigate expansions of periodic functions with respect to wavelet bases. Direct and inverse theorems for wavelet approximation in C and L p norms are proved. For the functions possessing local regularity we study the rate of pointwise convergence of wavelet Fourier series. We also define and i

Let \(\left\{\zeta_{\ldots}, \mathscr{F}_{n}, n \geqslant m \geqslant 1\right\}\) be a reverse martingale such that the distribution of \(\xi_{n}\) depends on \(x \in I \subset R=(-x, x)\) for each \(n \geqslant m\), and \(\breve{\zeta}_{n} \xrightarrow{a . x} x\). For a continuous bounded function

The connection between the approximation property and certain classes of locally convex spaces associated with the ideal B) of approximable operators will be discussed. It mill be shown that a FRECHET MOXTEL space has the approximation property iff it is a mixed @-space, or equivalently, iff its str