Sarkar Susmita

    susmita62@yahoo.co.in
    Department of Applied Mathematics, University of Calcutta, Kolkata, India

    Публикации:

    Гхош У., , Саркар С.
    Подробнее
    A brief outline of the derivation of the time-fractional nonlinear Schrödinger equation (NLSE) is furnished. The homotopy analysis method (HAM) is applied to study time-fractional NLSE with three separate trapping potential models that we believe have not been investigated yet. The first potential is a double cosine potential $[V(x)=V_1^{}\cos x+V_2^{}\cos 2x]$, the second one is the Morse potential $[V(x)=V_1^{}e^{-2\beta x}+V_2^{}e^{-\beta x}]$, and a hyperbolic potential $[V(x)=V_0^{}\tanh(x)sech(x)]$ is taken as the third model. The fractional derivatives and integrals are described in the Caputo and Riemann Liouville sense, respectively. The solutions are given in the form of convergent series with easily computable components. A physical analysis with graphical representations explicitly reveals that HAM is effective and convenient for solving nonlinear differential equations of fractional order.
    Ключевые слова: time fractional nonlinear Schrödinger equation (NLSE), homotopy analysis method (HAM), Caputo derivative, Riemann – Liouville fractional integral operator, trapping potential
    Цитирование: Гхош У., , Саркар С.,  Homotopy Analysis Method and Time-fractional NLSE with Double Cosine, Morse, and New Hyperbolic Potential Traps, Нелинейная динамика, 2022, Vol. 18, no. 2, с.  309-328
    DOI:10.20537/nd220211

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