Dynamical property of interaction solutions to the Chafee-Infante equation via NMSE method

Dynamical property of interaction solutions to the Chafee-Infante equation via NMSE method

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In this work, we study the Chafee-Infante model with conformable fractional derivative.This model describes the energy balance between equator and pole of solar system, which transmit energy via heat diffusion.To explore the multi soliton Drink Charms solutions and their interaction, we implemented the new modified simple equation (NMSE) scheme.Under some conditions, the obtained solutions are trigonometric, hyperbolic, exponential and their combine form.Only the proposed technique can be provided the solution in terms of trigonometric and hyperbolic form together directly.

The periodic, solitary wave and novel interaction of such solitary and sinusoidal solutions has also been established and discussed analytically.For the special values of the existing free parameter, some novel waveforms are existed AEG SteamBake BPS552020M Electric Oven - Stainless Steel 60cm for the proposed model including, periodic solution, double periodic wave solution, multi-kink solution.The behavior of the obtained solutions is presented in 3-D plot, density plot and counter plot with the help of computational software Maple 18.