Awasome Atangana Baleanu Fractional Derivative References

Awasome Atangana Baleanu Fractional Derivative References. Natural convection and wall oscillation instigate the flow over a vertical plate positioned in a porous medium. Theory and application to heat transfer model;

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Nowadays, fractional derivative is used to model various problems in science and engineering. The advantage is that its fractional derivatives can be calculated explicitly. 24 full pdfs related to this paper.

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The applied fractional operator is based on a nonsingular and nonlocal kernel. Few works using fractional derivatives have been studied in histrov (2017), atangana and baleanu (2016).

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The partial differential equations (pdes) are transmuted to ordinary differential equations (odes). Authors kolade m owolabi 1 , abdon atangana 1 affiliation.

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Theory and application to heat transfer model. We presented some useful properties of the new derivative and applied it to.

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Is paper gives a brief overview of. The current paper is about the investigation of a new integral transform introduced recently by jafari.

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Theory and application to heat transfer model. Fixed point theory has been used to establish the uniqueness and existence of solutions for the fractional dsek model.

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Theory and application to heat transfer model. We introduce a new reproducing kernel function with polynomial form.

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Chaos, solitons fractals, 89 (2016), pp. In the past few decades, the remarkable achievement of fractional calculus in diverse fields of engineering has been gradually realized.

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This paper gives a brief overview of the abc fractional derivative and its attributes. Then we derive a formula for the solution through the equivalent fractional functional.

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The partial differential equations (pdes) are transmuted to ordinary differential equations (odes). Few works using fractional derivatives have been studied in histrov (2017), atangana and baleanu (2016).

Nowadays, Fractional Derivative Is Used To Model Various Problems In Science And Engineering.

The partial differential equations (pdes) are transmuted to ordinary differential equations (odes). The applied fractional operator is based on a nonsingular and nonlocal kernel. Download chapter pdf 1 introduction.

The New Definition Of The Fractional Derivative Was Defined By Atangana And Baleanu In 2016.

Theory and application to heat transfer model; Based on this kernel function, a new collocation technique is developed for variable order fractional problems in the. In the past few decades, the remarkable achievement of fractional calculus in diverse fields of engineering has been gradually realized.

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Natural convection and wall oscillation instigate the flow over a vertical plate positioned in a porous medium. The analytical solutions have been obtained for temperature distribution and velocity field by employing laplace transforms technique for both sine and cosine. Fixed point theory has been used to establish the uniqueness and existence of solutions for the fractional dsek model.

The Fractional Differential Equations Have Becomes A Very Important Topic Of Many Scholars And Scientists.

We presented some useful properties of the new derivative and applied it to. The advantage is that its fractional derivatives can be calculated explicitly. In this paper, a new numerical method to approximate the generalized hattaf fractional derivative involving a nonsingular kernel is proposed.

Chaos, Solitons Fractals, 89 (2016), Pp.

According to this theory, we will define two operators. We then have developed a numerical technique based on the collocation method to solve the problem. 24 full pdfs related to this paper.