On the continuity of the solution operator to the wave map system

## Communicated by R. Racke We prove the existence of the wave operator for the system of the massive Dirac-Klein-Gordon equations in three space dimensions where the masses m, M>0. We prove that for the small final data w + ∈ (H 3 2 +l,1 ) 4 , (/ + 1 , / + 2 ) ∈ H 2+l,1 ×H 1+l,1 , with l = 5 4 -

## Abstract We first construct traveling wave solutions for the Schrödinger map in ℝ^2^ of the form __m__(__x__~1~, __x__~2~ − ϵ __t__), where __m__ has exactly two vortices at approximately $\font\open=msbm10 at 10pt\def\R{\hbox{\open R}}(\pm {{1}\over{2 \epsilon}}, 0) \in \R^2$ of degree ±1. We

## Abstract We consider the canonical solution operator to $ \bar \partial $ restricted to (0, 1)‐forms with coefficients in the generalized Fock‐spaces equation image We will show that the canonical solution operator restricted to (0, 1)‐forms with $ {\cal F}{m} $‐coefficients can be interpreted

Using Fourier techniques and the inner-outer factorization of holomorphic functions a complete description of the various solutions to the autocorrelation equation on a ÿnite interval is given. The Fourier transform of the solutions admits an representation involving Cauchy integrals and Blaschke p

## Abstract Two common strategies for solving the shallow water equations in the finite element community are the generalized wave continuity equation (GWCE) reformulation and the quasi‐bubble velocity approximation. The GWCE approach has been widely analysed in the literature. In this work, the qu