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Novel soliton structures of truncated M-fractional (4+1)-dim Fokas wave model

Tayyiaba Rasool, Rashida Hussain, Hadi Rezazadeh, Asghar Ali, Ulviye Demirbilek

2023Nonlinear Engineering15 citationsDOIOpen Access PDF

Abstract

Abstract In this research article, a nonlinear time–space fractional order (4+1)-dim Fokas wave equation that is crucial for examining the corporal marvels of waves on and inside the surface of water is examined. For this purpose, a well-known analytical method is utilized, namely, the Sardar sub-equation (SSE) method along with a truncated M-fractional derivative. As a result, many new families of solitary wave solutions, such as kink-type solitons, singular and periodic solitons, dark and bright solitons, are established. By using the SSE method, the outcomes are portrayed in 3-dim, 2-dim, and contour plots for distinct parametric values. The attained hyperbolic and trigonometric function-type results demonstrate the capability of recognizing the exact solutions of the other nonlinear evolution equations through the executed technique.

Topics & Concepts

Trigonometric functionsMathematical analysisSolitonHyperbolic functionNonlinear systemPeriodic waveTrigonometryType (biology)Space (punctuation)PhysicsFractional calculusFunction (biology)Traveling waveMathematicsMathematical physicsGeometryQuantum mechanicsComputer scienceEcologyEvolutionary biologyOperating systemBiologyNonlinear Waves and SolitonsFractional Differential Equations SolutionsAlgebraic structures and combinatorial models
Novel soliton structures of truncated M-fractional (4+1)-dim Fokas wave model | Litcius