Explicit exact solutions and conservation laws in a medium with competing weakly nonlocal nonlinearity and parabolic law nonlinearity
暂无分享,去创建一个
H. Rezazadeh | A. Kara | S. Y. Doka | A. Souleymanou | L. Akinyemi | A. Houwe | T. Bouétou | S. P. Mukam | Lanre Akinyemi
[1] S. Y. Doka,et al. Specific optical solitons solutions to the coupled Radhakrishnan–Kundu–Lakshmanan model and modulation instability gain spectra in birefringent fibers , 2021, Optical and Quantum Electronics.
[2] A. Houwe,et al. Brownian motion effects on W-shaped soliton and modulation instability gain of the (2+1)-dimensional nonlinear schrödinger equation , 2021, Optical and Quantum Electronics.
[3] S. Y. Doka,et al. Clout of fractional time order and magnetic coupling coefficients on the soliton and modulation instability gain in the Heisenberg ferromagnetic spin chain , 2021 .
[4] L. Akinyemi,et al. Two improved techniques for the perturbed nonlinear Biswas–Milovic equation and its optical solitons , 2021 .
[5] S. Y. Doka,et al. W-shaped profile and multiple optical soliton structure of the coupled nonlinear Schrödinger equation with the four-wave mixing term and modulation instability spectrum , 2021, Physics Letters.
[6] M. S. Hashemi,et al. Explicit solutions to nonlinear Chen–Lee–Liu equation , 2021, Modern Physics Letters B.
[7] M. S. Hashemi,et al. Optical soliton and weierstrass elliptic function management to parabolic law nonlinear directional couplers and modulation instability spectra , 2021, Optical and Quantum Electronics.
[8] S. Y. Doka,et al. M-shape and W-shape bright incite by the fluctuations of the polarization in a-helix protein , 2021, Physica Scripta.
[9] M. Inç,et al. Chirped solitary waves of the perturbed Chen–Lee–Liu equation and modulation instability in optical monomode fibres , 2021 .
[10] H. Rezazadeh,et al. Optical soliton solutions of the generalized non-autonomous nonlinear Schrödinger equations by the new Kudryashov’s method , 2021 .
[11] S. Abbagari,et al. Miscellaneous optical solitons in magneto-optic waveguides associated to the influence of the cross-phase modulation in instability spectra , 2021 .
[12] S. Y. Doka,et al. Survey of third- and fourth-order dispersions including ellipticity angle in birefringent fibers on W-shaped soliton solutions and modulation instability analysis , 2021, The European Physical Journal Plus.
[13] Olaniyi Samuel Iyiola,et al. Exact solutions of the generalized multidimensional mathematical physics models via sub-equation method , 2021, Math. Comput. Simul..
[14] H. Rezazadeh,et al. Optical soliton to multi-core (coupling with all the neighbors) directional couplers and modulation instability , 2021, The European Physical Journal Plus.
[15] M. Eslami,et al. Optical solitons for weakly nonlocal Schrödinger equation with parabolic law nonlinearity and external potential , 2021 .
[16] H. Rezazadeh,et al. A study of travelling, periodic, quasiperiodic and chaotic structures of perturbed Fokas–Lenells model , 2021, Pramana.
[17] K. U. Tariq,et al. On the conformable nonlinear schrödinger equation with second order spatiotemporal and group velocity dispersion coefficients , 2021 .
[18] Serge Y. Doka,et al. Generalized Darboux transformation and higher-order rogue wave solutions to the Manakov system , 2016, International Journal of Modern Physics B.
[19] S. Y. Doka,et al. Controllable rational solutions in nonlinear optics fibers , 2020, The European Physical Journal Plus.
[20] Wenxiu Ma,et al. Interaction solutions to Hirota-Satsuma-Ito equation in (2 + 1)-dimensions , 2019, Frontiers of Mathematics in China.
[21] Wenxiu Ma,et al. A SEARCH FOR LUMP SOLUTIONS TO A COMBINED FOURTH-ORDER NONLINEAR PDE IN (2+1)-DIMENSIONS , 2019, Journal of Applied Analysis & Computation.
[22] Jie Li,et al. A Study on Lump Solutions to a Generalized Hirota-Satsuma-Ito Equation in (2+1)-Dimensions , 2018, Complex..
[23] Wen-Xiu Ma,et al. Abundant lumps and their interaction solutions of (3+1)-dimensional linear PDEs , 2018, Journal of Geometry and Physics.
[24] A. Souleymanou,et al. Rogue wave dynamics in barotropic relaxing media , 2018, Pramana.
[25] A. Korkmaz. Complex Wave Solutions to Mathematical Biology Models I: Newell–Whitehead–Segel and Zeldovich Equations , 2018, Journal of Computational and Nonlinear Dynamics.
[26] A. R. Adem,et al. Perturbed optical solitons with spatio-temporal dispersion in (2 + 1)-dimensions by extended Kudryashov method , 2018 .
[27] A. Souleymanou,et al. Generalized Darboux transformation and parameter-dependent rogue wave solutions to a nonlinear Schrödinger system , 2018, Nonlinear Dynamics.
[28] A. Azad,et al. Traveling Wave Solutions to Some Nonlinear Fractional Partial Differential Equations through the Rational ( G ′/ G )-expansion Method , 2018 .
[29] S. Mohyud-Din,et al. A new modification in the exponential rational function method for nonlinear fractional differential equations , 2018 .
[30] H. Akça,et al. Image Processing and ‘Noise Removal Algorithms’—The Pdes and Their Invariance Properties & Conservation Laws , 2018 .
[31] Rubayyi T. Alqahtani,et al. Optical solitons for Lakshmanan–Porsezian–Daniel model with spatio-temporal dispersion using the method of undetermined coefficients , 2017 .
[32] Wen-Xiu Ma,et al. Conservation laws by symmetries and adjoint symmetries , 2017, 1707.03496.
[33] S. Mohyud-Din,et al. Optimal solutions for the evolution of a social obesity epidemic model , 2017 .
[34] Alper Korkmaz,et al. Exact Solutions to (3+1) Conformable Time Fractional Jimbo–Miwa, Zakharov–Kuznetsov and Modified Zakharov–Kuznetsov Equations , 2017 .
[35] T. Bouétou,et al. Localized waves in a general coupled nonlinear Schrödinger equation , 2017 .
[36] A. Bekir,et al. Tanh-type and sech-type solitons for some space-time fractional PDE models , 2017 .
[37] A. Bekir,et al. Dark Soliton Solutions of Space-Time Fractional Sharma–Tasso–Olver and Potential Kadomtsev–Petviashvili Equations , 2017 .
[38] M. Belić,et al. Dark and singular optical solitons with spatio-temporal dispersion using modified simple equation method , 2017 .
[39] A. Korkmaz. Exact solutions of space-time fractional EW and modified EW equations , 2016, 1601.01294.
[40] R. Ellahi,et al. Extracting new solitary wave solutions of Benny–Luke equation and Phi-4 equation of fractional order by using (G′/G)-expansion method , 2017 .
[41] S. Mohyud-Din,et al. A New Modification in Simple Equation Method and its applications on nonlinear equations of physical nature , 2017 .
[42] S. Mohyud-Din,et al. Exact solutions of (3 + 1)-dimensional generalized KP equation arising in physics , 2017 .
[43] S. Mohyud-Din,et al. Optimal solutions for a bio mathematical model for the evolution of smoking habit , 2017 .
[44] S. Mohyud-Din,et al. Optimal solutions for homogeneous and non-homogeneous equations arising in physics , 2017 .
[45] B. Bin-Mohsin,et al. A study of nonlinear biochemical reaction model , 2016 .
[46] M. Younis,et al. Exact solitons in a medium with competing weakly nonlocal nonlinearity and parabolic law nonlinearity , 2015 .
[47] A. Biswas,et al. OPTICAL SOLITONS WITH NONLINEAR DISPERSION IN PARABOLIC LAW MEDIUM , 2015 .
[48] M. M. Hassan,et al. New Exact Solutions of some (2 + 1)-Dimensional Nonlinear Evolution Equations Via Extended Kudryashov Method , 2014 .
[49] D. Yao,et al. Spatial optical solitons in fifth order and seventh order weakly nonlocal nonlinear media , 2013 .
[50] L. Debnath. Solitons and the Inverse Scattering Transform , 2012 .
[51] S. Mohyud-Din,et al. Numerical soliton solution of the Kaup‐Kupershmidt equation , 2011 .
[52] Syed Tauseef Mohyud-Din,et al. Analytical solution of wave system in Rn with coupling controllers , 2011 .
[53] O. Bang,et al. Analytical theory of dark nonlocal solitons. , 2010, Optics letters.
[54] Muhammad Aslam Noor,et al. Exp-Function Method for Generalized Travelling Solutions of Calogero-Degasperis-Fokas Equation , 2010 .
[55] M. Noor,et al. Some Relatively New Techniques for Nonlinear Problems , 2009 .
[56] M. Noor,et al. Traveling Wave Solutions of Seventh-order Generalized KdV Equations Using He's Polynomials , 2009 .
[57] Abdul-Majid Wazwaz,et al. Multiple-soliton solutions for the KP equation by Hirota's bilinear method and by the tanh-coth method , 2007, Appl. Math. Comput..
[58] A. Tollstén. Exact Solutions to , 1996 .
[59] H. Stephani. Differential Equations: Their Solution Using Symmetries , 1990 .
[60] V. Matveev,et al. Darboux transformation and explicit solutions of the Kadomtcev-Petviaschvily equation, depending on functional parameters , 1979 .