Residual Power Series Method for Fractional Swift–Hohenberg Equation

Abstract: In this paper, the approximated analytical solution for the fractional Swift–Hohenberg (S–H) equation has been investigated with the help of the residual power series method (RPSM). To ensure the applicability and efficiency of the proposed technique, we consider a non-linear fractional order Swift–Hohenberg equation in the presence and absence of dispersive terms. The effect of bifurcation and dispersive parameters with physical importance on the probability density function for distinct fractional Brownian a… Show more

“…(1) as a fractional power-series expansion about the initial point t = t 0 . It is worth mentioning that the proposed method can reduce the computational time and work as compared with other traditional techniques while maintaining the efficiency of the results obtained [69]. We have…”

Efficient analytical techniques for solving time-fractional nonlinear coupled Jaulent–Miodek system with energy-dependent Schrödinger potential

“…(1) as a fractional power-series expansion about the initial point t = t 0 . It is worth mentioning that the proposed method can reduce the computational time and work as compared with other traditional techniques while maintaining the efficiency of the results obtained [69]. We have…”

Efficient analytical techniques for solving time-fractional nonlinear coupled Jaulent–Miodek system with energy-dependent Schrödinger potential

“…There have been numerous pioneering orientations available for various definitions of FC, and which prescribed the foundation for FC . FC has been associated to practical ventures, and it has been extensively employed to nanotechnology, optics, human diseases, chaos theory, and other areas . The numerical and analytical solutions for fractional differential equations describing these phenomena play a vibrant role in portraying the nature of complex problems that ascends in connected areas of science.…”

An efficient analytical approach for fractional Lakshmanan‐Porsezian‐Daniel model

“…Fractional calculus has played an important role in describing many dynamical phenomena in applied science and engineering fields. Dynamical phenomena are noticed in different type of scientific fields such as physics, chemistry, continuum mechanics [1], chaos theory [2], biotechnology [3], electrodynamics [4], and many other fields [5][6][7]. This feature of fractional calculus has appealed to many researchers in the past [8][9][10][11][12].…”

Solution of Newell – Whitehead – Segal Equation of Fractional Order by Using Sumudu Decomposition Method