Advantages of the Differential Equations for Solving Problems in Mathematical Physics with Symbolic Computation
Mohamed A. Abdoon, Faeza Lafta Hasan
Abstract
In this paper, we have introduced the analytical solutions of the Benjamin-Bona-Mahony equation and the (2+1) dimensional breaking soliton equations with the help of a new Algorithm of first integral method formula two (AFIM), by depending on mathematical software’s. New and more general variety of families of exact solutions have been represented by different structures of 3rd dimension plotting and contouring plotting with different parameters. So, the solution in this research is unique, new and more general. We can apply in computer sciences, mathematical physics, with a different vision, general and Programmable.
Topics & Concepts
Symbolic computationContouringComputationVariety (cybernetics)SolitonDimension (graph theory)Applied mathematicsDifferential equationCalculus (dental)Mathematical softwareComputer scienceSoftwareAlgebra over a fieldMathematicsMathematical analysisPhysicsAlgorithmNonlinear systemArtificial intelligencePure mathematicsProgramming languageQuantum mechanicsComputer graphics (images)DentistryMedicinePolynomial and algebraic computationNonlinear Waves and SolitonsNumerical methods for differential equations