Optimal Integration of Lipschitz Functions with a Gaussian Weight

We present a method of fitting arbitrary functions to linear combinations of Gaussians. In particular, we discuss an adaptation of Prony's method, or separation of exponentials, which allows us to automatically select appropriate exponents for these Gaussians. We then apply this technique to the sel

Let S=[z # C: |Im(z)|<;] be a strip in the complex plane. H q , 1 q< , denotes the space of functions, which are analytic and 2?-periodic in S, real-valued on the real axis, and possess q-integrable boundary values. Let + be a positive measure on [0, 2?] and L p (+) be the corresponding Lebesgue spa

An accurate algorithm for the integration of the equations of motion arising in structural dynamics is presented. The algorithm is an unconditionally stable single-step implicit algorithm incorporating algorithmic damping. The displacement for a Single-Degree-of-Freedom system is approximated within

## Abstract We show that singular integral operators with piecewise continuous coefficients may gain massive spectra when considered in weighted spaces of continuous functions with a prescribed continuity modulus (generalized Hölder spaces __H^ω^__ (Γ, __ρ__ )), a fact known for example for Lebesgu