A Langevin equation for high-energy evolution with pomeron loops

We derive an evolution equation for the generating functional which accounts for processes for both gluon emission and recombination. In terms of color dipoles, the kernel of this equation describes evolution as a classical branching process with conserved probabilities. The introduction of dipole r

We describe a wavelet collocation method of computing numerical solutions to evolution equations that inherit energy conservation law. This method is based on the wavelet sampling approximation with Coifman scaling systems combined with the generalized energy integrals. In this paper, we shall focus

In this paper, we consider the following Kirchhoff type equation: with initial condition and zero Dirichlet boundary condition. We established sufficient conditions on the initial data with arbitrarily high energy such that the solution blows up in finite time. This result generalizes and improves