The current study dedicated to the compressible isentropic Navier–Stokes equations in one-
dimensional with a general pressure law. The Lie Group method is employed to reduce the …

The current study is dedicated to find the complex soliton solutions of the hyperbolic (2+ 1)-
dimensional nonlinear Schrödinger equation. In this direction we takes the help of Lie …

The current work is devoted for operating the Lie symmetry approach, to coupled complex
short pulse equation. The method reduces the coupled complex short pulse equation to a …

Abstract The variable coefficient KdV-Burgers (vc-KdVB) equation is widely used in many
physical models. In this paper, Fourier spectral method is introduced to solve the fractional …

In this paper, we investigate the existence and uniqueness results of intuitionistic fuzzy local
and nonlocal fractional boundary value problems by employing intuitionistic fuzzy fractional …

In this paper, we extended Lie symmetry theory to the class of space-time fractional
differential equation with a delay and carried out a complete group classification of space …

The current study is dedicated to the optical soliton solutions and modulation instability of
the Cubic–quartic Fokas–Lenells equation with nonlinear perturbation and polarization …

The current study is dedicated for operating the Lie symmetry approach, to complex short
pulse equation. The method reduces the complex short pulse equation to a system of …

In this article, the authors apply the Lie symmetry approach and the modified (G′/G) (G'/G)-
expansion method for seeking the solutions of time-dependent coupled KdV–Burgers …

In this work, Lie symmetry analysis method is utilized to find the complex soliton solutions of
the perturbed Fokas–Lenells equation. In this direction, first of all, we obtained the …