Purpose: The aim of this study is to introduce the stochastic dispersive Schrödinger–Hirota
equation with parabolic law nonlinearity (SHEPL) with multiplicative white noise via Ito …

This research is based on three main pillars which are studying the computational solutions
of the modified Benjamin–Bona–Mahony (BBM) equation via the modified Khater method …

The aim of this study is to peruse the dispersive Schrödinger–Hirota equation (SH equation)
with parabolic law linearity to get optical soliton solutions by utilizing the generalized …

In this paper, authors present a new method “Sawi decomposition method” for determining
the primitive of Volterra integral equation (VIE) with application. Sawi decomposition method …

A mathematical model describing the HIV/AIDS transmission dynamics in the existence of an
aware community using fractional differential operator having Mittag–Leffler kernel is …

Present study signifies the thermal analysis of the electroosmotic flow of Williamson fluid in
the presence of peristaltic propulsion and asymmetric zeta potential at the walls. The present …

This paper investigates the dynamics of exact travelling-wave solutions for nonlinear spatial
and temporal fractional partial differential equations with conformable order derivatives …

This article focuses on the approximate controllability of impulsive neutral stochastic
integrodifferential inclusions in Hilbert spaces. We used resolvent operators, fixed point …

The aim of this work is to investigate the Wick-type stochastic nonlinear evolution equations
with conformable derivatives. The general Kudryashov method is improved by a new …

A (2+ 1)‐dimensional fractional complex Ginzburg–Landau equation is solved via fractional
Riccati method and fractional bifunction method, and exact traveling wave solutions …