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Journal of Modern Optics Volume 63, 2016 - Issue 21
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Original Articles

Analytical study of solitons to Biswas–Milovic model in nonlinear optics

Qin ZhouSchool of Electronics and Information Engineering, Wuhan Donghu University, Wuhan, People’s Republic of China.Correspondence[email protected]
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,
M. EkiciFaculty of Science and Arts, Department of Mathematics, Bozok University, Yozgat, Turkey.View further author information
,
A. SonmezogluFaculty of Science and Arts, Department of Mathematics, Bozok University, Yozgat, Turkey.View further author information
,
M. MirzazadehFaculty of Technology and Engineering, East of Guilan, Department of Engineering Sciences, University of Guilan, Rudsar-Vajargah, Iran.View further author information
&
M. EslamiFaculty of Mathematical Sciences, Department of Mathematics, University of Mazandaran, Babolsar, Iran.View further author information
Pages 2131-2137 | Received 31 Dec 2015, Accepted 26 Apr 2016, Published online: 10 May 2016

References

  • Demiray, S.T.; Pandir, Y.; Bulut, H. Generalized Kudryashov Method for Time-fractional Differential Equations. Abstract Appl. Anal. 2014, 2014, 13p. Article ID 901540.
  • Kudryashov, N.A. One Method for Finding Exact Solutions of Nonlinear Differential Equations. Commun. Nonlinear Sci. Numer. Simul. 2012, 17, 2248–2253.
  • Biswas, A.; Milovic, D. Bright and Dark Solitons of the Generalized Nonlinear SchrÖDinger’s Equation’. Commun. Nonlinear Sci. Numer. Simul. 2010, 15, 1473–1484.
  • Topkara, E.; Milovic, D.; Sarma, A.K.; Zerrad, E.; Biswas, A. Optical solitons with Non-Kerr law Nonlinearity and Inter-modal Dispersion with Time-dependent Coefficients’. Commun. Nonlinear Sci. Numer. Simul. 2010, 15, 2320–2330.
  • Eslami, M.; Mirzazadeh, M. Optical Solitons with Biswas--Milovic equation for Power Law and Dual-power Law Nonlinearities. Nonlinear Dyn. 2016, 83, 731–738.
  • Zhou, Q. Optical Solitons for Biswas--Milovic Model with Kerr Law and Parabolic Law Nonlinearities. Nonlinear Dyn., 84, 677–681, doi:10.1007/s11071-015-2516-0.
  • Majid, F. 1-Soliton Solution of the Biswas--Milovic Equation with Log Law Nonlinearity. Caspian J. Math. Sci. 2012, 1, 88–93.
  • Sturdevant, B. Topological 1-soliton Solution of the Biswas--Milovic Equation with Power Law Nonlinearity. Nonlinear Anal.: Real World Appl. 2010, 11, 2871–2874.
  • Kohl, R.; Tinaztepe, R.; Chowdhury, A. Soliton Perturbation Theory of Biswas--Milovic Equation. Optik -- Int. J. Light Electron Opt. 2014, 125, 1926–1936.
  • Triki, H.; Biswas, A. Dark Solitons for a Generalized Nonlinear Schrödinger Equation with Parabolic Law and Dual-power Law Nonlinearities. Math. Methods Appl. Sci. 2011, 34, 958–962.
  • Mirzazadeh, M.; Eslami, M.; Hassan Arnous, A. Dark Optical Solitons of Biswas--Milovic Equation with Dual-power Law Nonlinearity. Eur. Phys. J. Plus. 2015, 130, 4.
  • Manafian, J.; Lakestani, M. Optical Solitons with Biswas--Milovic Equation for Kerr Law Nonlinearity. Eur. Phys. J. Plus. 2015, 130, 61.
  • Crutcher, S.H.; Osei, A. The Modulated Spatial Gausson Solution to the Biswas--Milovic Equation with Log Law Nonlinearity. Optik -- Int. J. Light Electron Opt. 2013, 124, 4678–4681.
  • Ahmed, I.; Mu, C.; Zhang, F. Exact Solution of the Biswas--Milovic Equation by Adomian Decomposition Method. Int. J. Appl. Math. Res. 2013, 2, 418–422.
  • Manafian, J. On the Complex Structures of the Biswas--Milovic Equation for Power, Parabolic and Dual Parabolic Law Nonlinearities. Eur. Phys. J. Plus. 2015, 130, 255.
  • Asif, N.; Shwetanshumala, S.; Konar, S. Photovoltaic Spatial Soliton Pairs in Two-photon Photorefractive Materials. Phys. Lett. A. 2008, 372, 735–740.
  • Konar, S.; Jana, S. Linear and Nonlinear Propagation of Sinh-Gaussian Pulses in Dispersive Media Possessing Kerr Nonlinearity. Opt. Commun. 2004, 236, 7–20.
  • Srivastava, S.; Konar, S. Two-component Coupled Photovoltaic Soliton Pair in Two-photon Photorefractive Materials under Open Circuit Conditions. Opt. Laser Technol. 2009, 41, 419–423.
  • Biswas, A.; Konar, S. Theory of Dispersion-managed Optical Solitons. Prog. Electromagnet. Res. 2005, 50, 83–134.
  • Guo, R.; Liu, Y.F.; Hao, H.Q.; Qi, F.H. Coherently Coupled Solitons, Breathers and Rogue Waves for Polarized Optical Waves in an Isotropic Medium. Nonlinear Dyn. 2015, 80, 1221–1230.
  • Guo, R.; Hao, H.Q. Propagation Properties of Soliton Solutions under the Influence of Higher Order Effects in Erbium Doped Fibers. Commun. Nonlinear Sci. Numer. Simul. 2014, 19, 3529–3538.
  • Dai, C.Q.; Zhu, H.P. Superposed Akhmediev Breather of the (3 + 1)-dimensional Generalized Nonlinear Schrödinger Equation with External Potentials. Ann. Phys. 2014, 341, 142–152.
  • Dai, C.Q.; Xu, Y.J.; Wang, Y. Nonautonomous Cnoidal Wave and Soliton Management in Parity-time Symmetric Potentials. Commun. Nonlinear Sci. Numer. Simul. 2015, 20, 389–400.
  • Lin, X.L.F.; Qi, F. Analytical Study on a Two-dimensional Korteweg-de Vriesmodel with Bilinear Representation, Backlund Transformation and Soliton Solutions. Appl. Math. Model. 2015, 39, 3221–3226.
  • Ma, X.L.M.; Yu, J.; Lin, F.; Khalique, C.M. Envelope Bright- and Dark-soliton Solutionsfor the Gerdjikov-Ivanov Model. Nonlinear Dyn. 2015, 82, 1211–1220.
  • Zhou, Q.; Zhu, Q.; Yu, H.; Xiong, X. Optical Solitons in Media with Time-modulated Nonlinearities and Spatiotemporal Dispersion. Nonlinear Dyn. 2015, 80, 983–987.
  • Zhou, Q.; Liu, L. Y. liu, H. Yu, P. Yao, C. Wei & H. Zhang. Exact Optical Solitons in Metamaterials with Cubic-quintic Nonlinearity and Third-order Dispersion. Nonlinear Dyn. 2015, 80, 1365–1371.
  • Zhou, Q.; Zhu, Q. Combined Optical Solitons with Parabolic Law Nonlinearity and Spatio-temporal Dispersion. J. Mod. Opt. 2015, 62, 483–486.
  • Xu, Y.; Savescu, M.; Khan, K.R.; Mahmood, M.F.; Biswas, A.; Belic, M. Soliton Propagation through Nanoscale Waveguides in Optical Metamaterials. Opt. Laser Technol. 2016, 77, 177–186.
  • Kara, A.H.; Razborova, P.; Biswas, A. Solitons and Conservation Laws of Coupled Ostrovsky Equation for Internal Waves. Appl. Math. Comput. 2015, 258, 95–99.

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