Moses Oyesanya scite author profile

This paper presents a comprehensive stability analysis of the dynamics of the damped cubic-quintic Duffing oscillator. We employ the derivative expansion method to investigate the slightly damped cubic-quintic Duffing oscillator obtaining a uniformly valid solution. We obtain a uniformly valid solution of the un-damped cubic-quintic Duffing oscillator as a special case of our solution. A phase plane analysis of the damped cubic-quintic Duffing oscillator is undertaken showing some chaotic dynamics which sends a signal that the oscillator may be useful as model for prediction of earth- quake occurrence.

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Fractional Order on the Impact of Climate Change With Dominant Earth’s Fluctuations

Eze

Oyesanya

2019

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In this investigation, fractional order model on the impact of climate change with dominant Earth’s fluctuations is given. The solution of the modelwas obtained using modified LaplaceAdomian decomposition method. The result is compared with the result obtained from integer solution.We observed that what is seen in the fractional part takes longer to be seen in the integer part.We also observed that regardless of any choice we make to mitigate climate change, the impact will still persist due to the effect of Earth’s fluctuations.

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Secondary bifurcation and imperfection sensitivity of cylindrical shell of finite length

Oyesanya

1990

International Journal of Non-Linear Mechanics

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A Fractional Order Hiv/Aids Model Using Caputo-Fabrizio Operator

Unaegbu

Onah

Oyesanya³

2021

AJID

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Background: HIV is a virus that is directed at destroying the human immune system thereby exposing the human body to the risk of been affected by other common illnesses and if it is not treated, it generates a more chronic illness called AIDS. Materials and Methods: In this paper, we employed the fixed-point theory in developing the uniqueness and existence of a solution of fractional order HIV/AIDS model having Caputo-Fabrizio operator. This approach adopted in this work is not conventional when solving biological models by fractional derivatives. Results: The results showed that the model has two equilibrium points namely, disease-free, and endemic equilibrium points, respectively. We showed conditions necessitating the existence of the endemic equilibrium point and showed that the disease-free equilibrium point is locally asymptotically stable. We also tested the stability of our solution using the iterative Laplace transform method on our model which was also shown stable agreeing with the disease-free equilibrium. Conclusions: Numerical simulations of our model showed clear comparison with our analytical results. The numerical solutions show that given fractional operator like the Caputo-Fabrizio operator, it is less noisy and plays a major role in making a precise decision and gives room (‘freedom’) to use data of specific patients as the model can be easily adjusted to accommodate this, as it a better fit for the patients’ data and provide meaningful predictions. Finally, the result showed the advantage of using fractional order derivative in the analysis of the dynamics of HIV/AIDS over the classical case.

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Moses Oyesanya

Discussing a Solution to Nonlinear Duffing Oscillator with Fractional Derivatives Using Homotopy Analysis Method (HAM)

Stability Analysis of Damped Cubic-Quintic Duffing Oscillator

Fractional Order on the Impact of Climate Change With Dominant Earth’s Fluctuations

Secondary bifurcation and imperfection sensitivity of cylindrical shell of finite length

A Fractional Order Hiv/Aids Model Using Caputo-Fabrizio Operator

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