The main goal of this study is to find solutions for the fractional model of the fifth-order weakly nonlocal Schrödinger equation incorporating nonlinearity of the parabolic law and …
S Qureshi, A Atangana - Chaos, Solitons & Fractals, 2020 - Elsevier
In connection with issues pertinent with humans' health, it is highly significant to comprehend the complex dynamics of the related infectious disease since the non …
This manuscript is devoted to focusing on the modeling and numerical solution of the dynamical model of Typhoid Fever. We use the Atangana–Baleanu operator with the Mittag …
In this article, a mathematical model for the transmission of COVID-19 disease is formulated and analysed. It is shown that the model exhibits a backward bifurcation at R 0= 1 when …
L Akinyemi, M Şenol, SN Huseen - Advances in Difference Equations, 2021 - Springer
We propose a new modification of homotopy perturbation method (HPM) called the δ- homotopy perturbation transform method (δ-HPTM). This modification consists of the …
This study examines the exact soliton solutions under the effect of cubic-quintic-septic nonlinearities for a sixth-order (3+ 1)-dimensional nonlinear time-fractional Schrödinger …
Pine wilt disease is caused by nematodes transmitted by pine sawyer beetles and is fatal for several pine species. The trees might be destroyed within a few months after being attacked …
The analytical solutions of the integrable generalized (2+ 1)-dimensional nonlinear conformable Schrödinger (NLCS) system of equations was explored in this paper with the …
Nigeria, like most other countries in the world, imposes lockdown as a measure to curtail the spread of COVID-19. But, it is known fact that in some countries the lockdown strategy could …