Regularization for heat kernel in nonlinear parabolic equations (Q928370)

The author considers two types of semilinear perturbations of the heat equation and a semilinear perturbation of the Schrödinger equation, with singular initial data and singular potential. Existence and uniqueness of solutions \(u_\varepsilon\) in the Colombeau spaces are proved for the regularized integral form of the above equations. Further, the author shows that for sufficiently good data, these solutions \(u_\varepsilon\) converge to the classical solution \(u\) as \(\varepsilon\to 0\).