@article{MAKHILLJEAS2019141217953,
    title = {New Application for Generalized Regularized Long Wave (GRLW) Equation,
Modified Dispersive Water Wave (MDWW) Equation and
Kawahara Equation by Homogeneous Balance Method},
    journal = {Journal of Engineering and Applied Sciences},
    volume = {14},
    number = {12},
    pages = {4010-4017},
    year = {2019},
    issn = {1816-949x},
    doi = {jeasci.2019.4010.4017},
    url = {https://makhillpublications.co/view-article.php?issn=1816-949x&doi=jeasci.2019.4010.4017},
    author = {Wafaa M.,Israa A. and},
    keywords = {Homogeneous balance method,generalized regularized long wave equation,modified
dispersive water wave equation,Kawahara equation and solitary wave solutions,obtained results,hypothesis},
    abstract = {This research study examines the homogeneous balance method to obtain an exact solution of
travelling wave non-linear equations. The proposed homogeneous balance method is used to obtain new
solutions for Generalized Regularized Long Wave (GRLW) equation, Modified Dispersive Water Wave
(MDWW) equation and Kawahara equation. Many solitary wave solutions are calculated from the solution by
the hyperbolic function when parameters were taken as special values. The obtained results are compared with
the F-expansion method solution and (G&#146;/G)-expansion method solution. The comparison reveals that our
obtained results are identical to the F-expansion method and (G&#146;/G)-expansion method solutions when certain
hypothesis is adopted. Maple Software is used to plot the 3D graph of the obtained exact solution.}
    }