JOURNAL OF FUNCTION SPACES, cilt.2022, ss.1-24, 2022 (SCI-Expanded)
KABUL EDİLDİ
Here, the miscellaneous soliton solutions of the generalized nonlinear Schrodinger equation are considered that describe the
model of few-cycle pulse propagation in metamaterials with parabolic law of nonlinearity. The novel analytical wave solutions
to the mentioned nonlinear equation in the sense of nonlinear ordinary dierential transform equation are obtained. The techniques
are the improved exp(($)) function method and the improved simple equation method. The nonlinear ordinary
transform to concern the generalized Schrodinger equation to convert it for a solvable integer-order dierential equation is used.
After the successful implementation of the presented methods the exact solitary wave solutions in the form of trigonometric,
rationales, and hyperbolic functions