THERMAL SCIENCE
International Scientific Journal
AN ANALYTICAL APPROACH TO FRACTIONAL BOUSINESQ-BURGES EQUATIONS
ABSTRACT
This paper proposes an analytical approach to fractional calculus by the fractional complex transform and the modified variational iteration method. The fractional Bousinesq-Burges equations are used as an example to reveal the main merits of the present technology.
KEYWORDS
PAPER SUBMITTED: 2019-04-27
PAPER REVISED: 2019-11-01
PAPER ACCEPTED: 2019-11-01
PUBLISHED ONLINE: 2020-06-21
THERMAL SCIENCE YEAR
2020, VOLUME
24, ISSUE
Issue 4, PAGES [2581 - 2588]
- Kumar, S., et al., Two Analytical Methods for Time-fractional Nonlinear Coupled Boussinesq-Burger's Equations Arise in Propagation of Shallow Water Waves, Nonlinear Dynamics, 85 (2016), 2, pp. 699-715
- He, J. H., A New Fractal Derivation, Thermal Science, 15 (2011), Suppl. 1, pp. S145-S147
- He, J. H., et al., A New Fractional Derivative and its Application to Explanation of Polar Bear Hairs, Journal of King Saud University-Science, 28 (2016), 2, pp. 190-192
- He J. H., Fractal Calculus and its Geometrical Explanation, Results in Physics, 10 (2018), Sept., pp. 272-276
- He, J. H., A Simple Approach to One-Dimensional Convection-Diffusion Equation and Its Fractional Modification for E Reaction Arising in Rotating Disk Electrodes, Journal of Electroanalytical Chemistry, 854 (2019), 113565
- Wang, Q. L., et al., Fractal Calculus and its Application to Explanation of Biomechanism of Polar Bear Hairs, Fractals, 26 (2018), 6, 1850086
- Wang, Y., Deng, Q., Fractal Derivative Model for Tsunami Travelling, Fractals, 27 (2019), 1, 1950017
- He, J. H., A Tutorial Review on Fractal Space Time and Fractional Calculus, International Journal of Theoretical Physics, 53 (2014), 11, pp. 3698-718
- Geng, X. G., Wu, Y. T., Finite-Band Solutions of the Classical Boussinesq-Burgers Equations, Journal of Mathematical Physics, 40 (1999), 6, pp. 2971-2982
- Zhang, J., et al., Quasi-Periodic Solution of the (2+1)-Dimensional Boussinesq-Burgers Soliton Equation, Physica A: Statistical Mechanics and its Applications, 319 (2003), Mar., pp. 213-232
- Yu, D. N., et al., Homotopy Perturbation Method with an Auxiliary Parameter for Nonlinear Oscillators, Journal of Low Frequency Noise, Vibration & Active Control, 38 (2019), 3-4, pp. 1540-1554
- Wu,Y., He, J.H., Homotopy Perturbation Method for Nonlinear Oscillators with Coordinate-Dependent Mass, Results in Physics, 10 (2018), Sept., pp. 270-271
- He, J. H., Homotopy Perturbation Method with Two Expanding Parameters, Indian Journal of Physics, 88 (2014), 2, pp. 193-196
- He, J. H., Homotopy Perturbation Method with an Auxiliary Term, Abstract and Applied Analysis, 2012 (2012), ID 857612
- He, J. H., Approximate Analytical Solution for Seepage Flow with Fractional Derivatives in Porous Me-dia, Computer Methods in Applied Mechanics and Engineering, 167 (1998), 1-2, pp. 57-68
- He, J. H., Variational Iteration Method-a Kind of Non-linear Analytical Technique: Some Examples, International Journal of Non-Linear Mechanics, 34 (1999), 4, pp. 699-708
- Anjum, N., He, J. H., Laplace Transform: Making the Variational Iteration Method Easier, Applied Mathematics Letters, 92 (2019), June, pp. 134-138
- Lu, J. F., Ma, L., The VIM-Padé Technique for Strongly Nonlinear Oscillators with Cubic and Harmonic Restoring Force, Journal of Low Frequency Noise, Vibration and Active Control, 38 (2019), 3-4, pp. 1272-1278
- Ren, Z. F., et al., He's Multiple Scales Method for Nonlinear Vibrations, Journal of Low Frequency Noise, Vibration and Active Control, 38 (2019), 3-4, pp. 1708-1712
- He, J. H., The Simpler, the Better: Analytical Methods for Nonlinear Oscillators and Fractional Oscillators, Journal of Low Frequency Noise, Vibration and Active Control, 38 (2019), 3-4, pp. 1252-1260
- Li, F. Q., Nadeem, M., He-Laplace Method for Nonlinear Vibration in Shallow Water Waves, Journal of Low Frequency Noise, Vibration and Active Control, 38 (2019), 3-4, pp. 1305-1313
- He, J. H., Li, Z. B., Converting Fractional Differential Equations into Partial Differential Equations, Thermal Science, 16 (2012), 2, pp. 331-334
- He, J. H., Ji, F. Y., Two-Scale Mathematics and Fractional Calculus for Thermodynamics, Thermal Science, 23 (2019), 4, pp. 2131-2133
- Li, Z. B., et al., Exact Solutions of Time-Fractional Heat Conduction Equation by the Fractional Complex Transform, Thermal Science, 16 (2012), 2, pp. 335-338
- He, J. H., Ji, F. Y., Two-Scale Mathematics and Fractional Calculus for Thermodynamics, Thermal Science, 23 (2019), 4, pp. 2131-2133
- Ain, Q. T., He, J. H., On Two-Scale Dimension and its Applications, Thermal Science 23 (2019), 3B, pp. 1701-1712
- Abassy, T. A., et al., Toward a Modified Variational Iteration Method, Journal of Computational and Applied Mathematics, 207 (2007), 1, pp. 137-147
- Lu, J. F., Numerical Analysis of the (2+1)-Dimensional Boiti-Leon-Pempinelli Equation, Thermal Science, 21 (2017), 4, pp. 1657-1663
- Ren, Z. F., et al., He's Multiple Scales Method for Nonlinear Vibrations, Journal of Low Frequency Noise Vibration and Active Control, 38 (2019), 3-4, pp. 1708-1712
- He, J. H., et al., A New Fractional Derivative And Its Application To Explanation Of Polar Bear Hairs, Journal of King Saud University - Science, 28 (2016), 2, pp.190-192
- Wang, Y., et al., A Variational Formulation for Anisotropic Wave Traveling in a Porous Medium, Fractals, 27 (2019), 4, ID 1950047
- Wang, K. L., He, C. H. A Remark on Wang's Fractal Variational Principle, Fractals, 27 (2019), 8, ID 1950134
- Wang, Y. H., CTE Method to the Interaction Solutions of Boussinesq-Burgers Equations, Applied Mathematics Letters, 38 (2014), Dec., pp. 100-105
- He, J. H., Ji, F. Y., Taylor Series Solution for Lane-Emden Equation, Journal of Mathematical Chemistry, 57 (2019), 8, pp. 1932-1934
