Modified homotopy methods for generalized fractional perturbed Zakharov–Kuznetsov equation in dusty plasma

Abstract: We propose a new modification of homotopy perturbation method (HPM) called the δ-homotopy perturbation transform method (δ-HPTM). This modification consists of the Laplace transform method, HPM, and a control parameter δ. This control convergence parameter δ in this new modification helps in adjusting and controlling the convergence region of the series solution and overcome some limitations of HPM and HPTM. The δ-HPTM and q-homotopy analysis transform method (q-HATM) are considered to study the generalized ti… Show more

“…The Lump and optical solitons solutions are derived by researchers in [35] with the analytical method, and authors in [36] derived some stimulating results associated with bipartite graph and fractional operator. The projected method is hired by the scholars to investigate the system associated with Jaulent-Miodek system with energy-dependent Schrödinger potential [37], the epidemic model of childhood disease [38], liquids with gas bubbles models [39], the Zakharov-Kuznetsov equation in dusty plasma [40], and Degasperis-Procesi equations [41]. In a two-dimensional channel flow, the impact of bottom configurations on the free-surface waves is investigated with the help of the forced Kortewegde Vries equation.…”

A computational approach for shallow water forced Korteweg–De Vries equation on critical flow over a hole with three fractional operators

“…The Lump and optical solitons solutions are derived by researchers in [35] with the analytical method, and authors in [36] derived some stimulating results associated with bipartite graph and fractional operator. The projected method is hired by the scholars to investigate the system associated with Jaulent-Miodek system with energy-dependent Schrödinger potential [37], the epidemic model of childhood disease [38], liquids with gas bubbles models [39], the Zakharov-Kuznetsov equation in dusty plasma [40], and Degasperis-Procesi equations [41]. In a two-dimensional channel flow, the impact of bottom configurations on the free-surface waves is investigated with the help of the forced Kortewegde Vries equation.…”

A computational approach for shallow water forced Korteweg–De Vries equation on critical flow over a hole with three fractional operators

“…Later, they suggest the concept of calculus with fractional order called fractional calculus (FC) [1,2,3,4,5]. Even though it originated earlier, it recently fascinated scholars to investigate more essential behaviours the mathematical models described by differential equations [6,7,8,9,10]. On the other hand, the study of climate with irregularly intervallic changes in sea surface and wind temperatures is a hot topic in the present era due to its significance in diverse fields associated with living beings.…”

A Numerical Approach to the Coupled Atmospheric Ocean Model Using a Fractional Operator

“…Fractional calculus has recently been discussed in various research works in multidisciplinary sciences due to its powerful applicability in modeling various scientific phenomena due to the property of the nonlocality and memory effect that some physical systems exhibit. Therefore, some interesting research works concerning the mathematical analysis and applications of fractional calculus have been discussed in [1][2][3][4][5][6][7][8][9][10][11][12][13]. The fractional calculus of variable order extends the theory of the constant order one.…”

Existence and U-H-R Stability of Solutions to the Implicit Nonlinear FBVP in the Variable Order Settings