Localization for one-dimensional random potentials with large local fluctuations

Abstract

We study the localization of wave functions for one-dimensional Schr\"odinger Hamiltonians with random potentials V(x) with short range correlations and large local fluctuations such that ∫x V(x)V(0)=∞. A random supersymmetric Hamiltonian is also considered. Depending on how large the fluctuations of V(x) are, we find either new energy dependences of the localization length, locE/E, locEμ/2 with 0<μ<2 or locμ-1E for μ>1, or superlocalization (decay of the wave functions faster than a simple exponential).