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Lump, multi-wave, kinky breathers, interactional solutions and stability analysis for general (2 + 1)-rth dispersionless Dym equation

Sarfaraz Ahmed, Romana Ashraf, Aly R. Seadawy, Syed T. R. Rizvi, Muhammad Younis, Ali Althobaiti, Ahmed M. El‐Shehawi

2021Results in Physics65 citationsDOIOpen Access PDF

Abstract

The Lump, multi-wave, breather, interactional solutions and stability analysis for the general r-th dispersionless Dym equation are obtained by some fruitful transformations. This approach based on an hypothesis that includes a general quadratic polynomial function with some appropriate parameters. Also for finding multi-wave, breathers and interaction phenomena we use different assumptions that includes trigonometric and exponential functions. Eventually, lump, multi-wave, bright lump, dark lump and breather wave profiles of the solutions are analyzed. These results are drawn out graphically by choosing suitable different values of parameters with detailed behavior of physical structure. At the end, we also check the stability of the governing model.

Topics & Concepts

BreatherQuadratic equationStability (learning theory)Exponential functionTrigonometric functionsMathematical analysisQuadratic functionPolynomialMathematicsTrigonometryPhysicsMathematical physicsNonlinear systemQuantum mechanicsGeometryComputer scienceMachine learningNonlinear Waves and SolitonsNonlinear Photonic SystemsAdvanced Mathematical Physics Problems
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