Modulation theory for self-focusing in the nonlinear Schr\"odinger-Helmholtz equation

Abstract

The nonlinear Schr\"odinger-Helmholtz (SH) equation in N space dimensions with 2σ nonlinear power was proposed as a regularization of the classical nonlinear Schr\"odinger (NLS) equation. It was shown that the SH equation has a larger regime (1σ<4N) of global existence and uniqueness of solutions compared to that of the classical NLS (0<σ<2N). In the limiting case where the Schr\"odinger-Helmholtz equation is viewed as a perturbed system of the classical NLS equation, we apply modulation theory to the classical critical case (σ=1,\:N=2) and show that the regularization prevents the formation of singularities of the NLS equation. Our theoretical results are supported by numerical simulations