A property of L-functions on the real line

Continuity properties of the scattering transform associated to the Schrödinger operator on the real line are studied. Stability estimates of Lipschitz type are derived for the scattering and inverse scattering transforms.

## 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

We study polynomial approximation on the whole real line with weight \(w=e^{-Q}\), where \(Q\) has polynomial growth at infinity. The following are the main problems considered: asymptotics for the Markov factors and for the rate of best approximation of \(|x|\), Jackson-type estimates for the degre