A numerical study of compactons
Mathematics and Computers in Simulation
Patterns on liquid surfaces: cnoidal waves, compactons and scaling
Physica D - Special issue on nonlinear waves and solitons in physical systems
A computational approach to soliton solutions of the Kadomtsev-Petviashvili equation
Applied Mathematics and Computation
Applied Mathematics and Computation
Applied Mathematics and Computation
Compactons and solitary patterns structures for variants of the KdV and the KP equations
Applied Mathematics and Computation
Compact and noncompact structures in a class of nonlinearly dispersive equations
Mathematics and Computers in Simulation - Nonlinear waves: computation and theory II
An analytic study of compactons structures in a class of nonlinear dispersive equations
Mathematics and Computers in Simulation
Compactons in a class of nonlinear dispersive equations
Mathematical and Computer Modelling: An International Journal
Linear B-spline finite element method for the improved Boussinesq equation
Journal of Computational and Applied Mathematics
Different physical structures of solutions for a generalized Boussinesq wave equation
Journal of Computational and Applied Mathematics
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Variants of the improved Boussinesq equation with positive and negative exponents are investigated. It is formally shown that these nonlinear variants give rise to compact and non-compact physical structures, where compactons, solitons, solitary patterns and periodic solutions are developed. The presented sine/cosine ansatz is reliable.