(2+1)-dimensional dissipation nonlinear Schrödinger equation for envelope Rossby solitary waves and chirp effect

Abstract: In the past few decades, the (1+1)-dimensional nonlinear Schrödinger (NLS) equation had been derived for envelope Rossby solitary waves in a line by employing the perturbation expansion method. But, with the development of theory, we note that the (1+1)-dimensional model cannot reflect the evolution of envelope Rossby solitary waves in a plane. In this paper, by constructing a new (2+1)-dimensional multiscale transform, we derive the (2+1)-dimensional dissipation nonlinear Schrödinger equation (DNLS) to descri… Show more

“…The solitary waves are steady nonlinear waves, [45,46] and are formed due to the balance between nonlinearity and dispersion. The degree of nonlinearity is proportional to the potential of the plasma system and a highly nonlinear medium causes high electrostatic potential.…”

Nucleus-acoustic solitary waves in self-gravitating degenerate quantum plasmas

“…The solitary waves are steady nonlinear waves, [45,46] and are formed due to the balance between nonlinearity and dispersion. The degree of nonlinearity is proportional to the potential of the plasma system and a highly nonlinear medium causes high electrostatic potential.…”

Nucleus-acoustic solitary waves in self-gravitating degenerate quantum plasmas