NOVEL APPROACHES TO FRACTIONAL KLEIN–GORDON–ZAKHAROV EQUATION
KANG LE WANG
Abstract
The Klein–Gordon–Zakharov equation is an important and interesting model in physics. A fractional Klein–Gordon–Zakharov model is described by employing beta-derivative. Some new solitary wave solutions are acquired by utilizing the fractional rational [Formula: see text]–[Formula: see text] method and fractional [Formula: see text] method. Some 3D graphs are depicted to elaborate these new solitary wave solutions. The work is very helpful to study other related types of fractional evolution equations.
Topics & Concepts
Klein–Gordon equationFractional calculusMathematicsMathematical physicsTraveling waveWork (physics)Applied mathematicsWave equationPhysicsMathematical analysisNonlinear systemQuantum mechanicsNonlinear Waves and SolitonsNonlinear Photonic SystemsFractional Differential Equations Solutions