Properties of the Scattering Transform on the Real Line

## Abstract We investigate analytical properties of a measure geometric Laplacian which is given as the second derivative $ {d \over {d \mu}} {d \over {d \nu}} $ w.r.t. two atomless finite Borel measures __μ__ and __ν__ with compact supports supp __μ__ ⊂ supp __ν__ on the real line. This class of o

In this paper we investigate L 2 boundedness properties of the Poisson transform associated to a symmetric space of real rank one and prove a related Planchereltype theorem.

Axiom of Choice, weak axioms of choice, real line. ## MSC (2000) 03E25, 03E35 We investigate, within the framework of Zermelo-Fraenkel set theory ZF, the interrelations between weak forms of the Axiom of Choice AC restricted to sets of reals.

Let ,: (& , ) Ä (0, ) be a given continuous even function and let m be a positive integer. We show that, with some additional restrictions on ,, there exist decreasing sequences x 1 , ..., x m and y 1 , ..., y m&1 of symmetrically located points on (& , ) and corresponding polynomials P and Q of deg

It follows trivially from old results of Majda and Lax Phillips that connected obstacles K with real analytic boundary in R n are uniquely determined by their scattering length spectrum. In this paper we prove a similar result in the general case (i.e. K may be disconnected) imposing some non-degene