On computation of solution for (2+1) dimensional fractional order general wave equation

In this research article, we handle a class of (2+1) dimensional wave equations under fractional-order derivatives using an iterative integral transform due to Laplace. The concerned derivative is taken in the Caputo's sense. The proposed method is ...

Study of 1+1 dimensional fractional order non-linear Benney equation using an analytical technique

The area related to fractional order partial differential equations (FOPDEs) has also attracted attention. Therefore, we focuss our attention to study nonlinear Benney equations of using power law type Caputo derivative of fractional order. To compu...

Dufour and Soret diffusions phenomena for the chemically reactive MHD viscous fluid flow across a stretching sheet with variable properties

The flow of fluid on a slandering stretchable sheet with variable thickness can have several engineering applications like design and optimization of, aerodynamic structures such as wings and airfoils, wind turbine blade design, efficient cooling sy...

COVID-19 Spread Modeling Incorporating Suggestive Optimal Control Strategies under Uncertainty

In the present paper, we have provided a five-compartmental epidemic model in an interval environment to analyze the spread of COVID-19 infection in India. The proposed model divides the entire population of India into five classes. They are suscept...

Viscous dissipated hybrid nanoliquid flow with Darcy–Forchheimer and forced convection over a moving thin needle

Non pharmaceutical interventions for optimal control of COVID-19

Series solutions for nonlinear time-fractional Schrödinger equations: Comparisons between conformable and Caputo derivatives

Existence of fractional order semianalytical results for enzyme kinetics model

On modeling of coronavirus-19 disease under Mittag-Leffler power law

Fractional dynamical analysis of measles spread model under vaccination corresponding to nonsingular fractional order derivative

Oscillation criteria for forced and damped nabla fractional difference equations

Based on the properties of Riemann–Liouville difference and sum operators, sufficient conditions are established to guarantee the oscillation of solutions for forced and damped nabla fractional difference equations. Numerical examples are presented ...

Theories and analyses thick hyperbolic paraboloidal composite shells

This paper presents the stress resultants of hyperbolic paraboloidal shells using higher order shear deformation theory recently developed by Zannon [1]-[3]. The equilibrium equations of motion use Hamilton’s minimum energy principle for a simply su...

Fractional-calculus diffusion equation

Sequel to the work on the quantization of nonconservative systems using fractional calculus and quantization of a system with Brownian motion, which aims to consider the dissipation effects in quantum-mechanical description of microscale systems. Th...

Fractional-calculus diffusion equation

Sequel to the work on the quantization of nonconservative systems using fractional calculus and quantization of a system with Brownian motion, which aims to consider the dissipation effects in quantum-mechanical description of microscale systems. Th...

Modeling fish community dynamics in the Florida Everglades: role of temperature variation

Temperature variation is an important factor in Everglade wetlands ecology. A temperature fluctuation from 17°C to 32°C recorded in the Everglades may have significant impact on fish dynamics. The short life cycles of some of Everglade fishes has re...