Numerical solution of scattering equations with nonlocal potentials

In this paper we investigate the existence of mild solutions to first order semilinear differential equations in Banach spaces with nonlocal conditions. We shall rely on a fixed point theorem for compact maps due to Schaefer.

In this paper, we discuss the long-time behavior of positive solutions of Burgers' equation \(u\_{t}=u\_{x x}+\varepsilon u u\_{x}, 00, t>0\) with the nonlocal boundary condition: \(u(0, t)=0, \quad u\_{x}(1, t)+\frac{1}{2} \varepsilon u^{2}(1, t)=a u^{p}(1, t)\left(\int\_{0}^{1} u(x, t) d x\right)^

The Lippmann-Schwinger equation for the reactance operator is converted into a system of linear equations. By using spline functions the principal-value singularity of the integral kernel can be treated analytically. Throughout this work recurrence relations suitable for automatic computation are de