Abstract
In this article, we address dissipative nonlinear Schrodinger equation (d-NLSE) in (1 + 1) -dimensions influenced by spatial dissipations effects via applying logarithmic transformation and symbolic computation with the ansatz function method. The d-NLSE is applied to model the dissipative self-modulating monochromatic waves with dispersion. We analytically create the bright and dark optical soliton for d-NLSE. In addition, singular solutions of type-I, type-II, periodic, multiwave, M-shaped rational and their interactions with one and two kink waves, homoclinic breathers are derived. Furthermore, a few 3D, 2D and contour shapes will be shown to predict the wave dynamics.