Anderson localization and saturable nonlinearity in one-dimensional disordered lattices

Abstract: We investigate numerically the propagation and the Anderson localization of plane waves in a one-dimensional lattice chain, where disorder and saturable nonlinearity are simultaneously present. Using a calculation scheme for solving the stationary discrete nonlinear Schrödinger equation in the fixed input case, the disorder-averaged logarithmic transmittance and the localization length are calculated in a numerically precise manner. The localization length is found to be a nonmonotonic function of the incident… Show more

“…Therefore, we developed a reliable theoretical method for solving Eqs. (4) and (5) numerically in the situation where the incident wave intensity, 2 0 , r is fixed [43][44][45]. In particular, we first assume that t is a certain positive real number.…”

Wave Propagation and Localization in a Complex Random Potential with Power-law Correlations: A Numerical Study

“…Therefore, we developed a reliable theoretical method for solving Eqs. (4) and (5) numerically in the situation where the incident wave intensity, 2 0 , r is fixed [43][44][45]. In particular, we first assume that t is a certain positive real number.…”

Wave Propagation and Localization in a Complex Random Potential with Power-law Correlations: A Numerical Study

Engineering zero modes, Fano resonance, and Tamm surface states in the waveguide-array realization of the modified Su-Schrieffer-Heeger model