2019
DOI: 10.3390/sym11121431
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Application of Fractional Residual Power Series Algorithm to Solve Newell–Whitehead–Segel Equation of Fractional Order

Abstract: The Newell–Whitehead–Segel equation is one of the most nonlinear amplitude equations that plays a significant role in the modeling of various physical phenomena arising in fluid mechanics, solid-state physics, optics, plasma physics, dispersion, and convection system. In this analysis, a recent numeric-analytic technique, called the fractional residual power series (FRPS) approach, was successfully employed in obtaining effective approximate solutions to the Newell–Whitehead–Segel equation of the fractional se… Show more

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Cited by 40 publications
(27 citation statements)
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“…Meanwhile, the same procedure can be performed for other cases. To do that, let p and D 1 1 p are (1)-differentiable, that is, D 1 n p(t) and D 2 n,m p(t) exists, therefore, according to the RPS approach [25][26][27][28][29], the solutions of the converted crisp system (5) at t 0 = 0 can be given by the following forms:…”
Section: The Rps Methods For Fuzzy Duffing Oscillatormentioning
confidence: 99%
See 2 more Smart Citations
“…Meanwhile, the same procedure can be performed for other cases. To do that, let p and D 1 1 p are (1)-differentiable, that is, D 1 n p(t) and D 2 n,m p(t) exists, therefore, according to the RPS approach [25][26][27][28][29], the solutions of the converted crisp system (5) at t 0 = 0 can be given by the following forms:…”
Section: The Rps Methods For Fuzzy Duffing Oscillatormentioning
confidence: 99%
“…By applying the same procedure until an arbitrary order n, the desirable unknown coefficients a n and b n of the series solutions (11) can be obtained, and then the n th -truncated series solutions p n,1r (t) and p n,2r (t) of (1,1)-system are also given. On the other hand, more iterations of n lead to more accurate solutions [28][29][30].…”
Section: The Rps Methods For Fuzzy Duffing Oscillatormentioning
confidence: 99%
See 1 more Smart Citation
“…In the light of showing the agreement between the exact solutions and CRPS solutions at = 1 of Equations (20) and (21), the absolute and relative errors are listed in Table A1 (Appendix A) for = 9 and at some selected grid points ( , ) in the domain [0, 1] × [0, 1] with step-size 0.1 for time and space directions. From the table, it can be noted that the CRPS approximate solutions are in good agreement with the exact solutions over the domain of interest.…”
Section: Example 1 Consider the Following Linear Fractional Schrödinmentioning
confidence: 99%
“…Unlike the classical calculus, which has unique definitions and clear geometrical and physical interpretations, there are numerous definitions for the operations of differentiation and integration of fractional order. Riemann-Liouville, Riesz, Grünwald-Letnikov, and Caputo are some examples of these definitions [21][22][23][24]. In this light, a novel definition of fractional derivative, the conformable fractional concept, was proposed in 2014 by Khalil et al [25].…”
Section: Introductionmentioning
confidence: 99%