Mathematical Study of Emphysema and Its Complications Using the Homotopy Perturbation Method

Authors

  • Gowri. P
  • Hari Prasath. R. K
  • Sowmiya. S
  • Renie. C

Abstract

Mathematical Study of Emphysema And Its Complications Using The Homotopy Perturbation Method” is a paper in which we can determine the increase or decrease in the size of population of Emphysema. Emphysema is a kind of lung disease which makes the breathing process very difficult for a normal person. A deterministic Mathematical Equation of the Emphysema was framed as Non-Linear Differential Equation and Boundary Condition is applied to it. The equation is solved using the power series and integrated with respect to time. The results are represented graphically using Matlab Software. From the Graph we can observe that the level of Emphysema varies for the parameters like mortality rate, possibility of a  Emphysema patient developing a complication, the rate at which complications are cured and the rate at which patients with complication become severely disabled. Homotopy Perturbation Method is more efficient and can give solutions with greater accuracy. This Paper can be used to Predict the number of patients with more complications faced due to Emphysema and prevent patients from this disease.

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Published

2020-01-22

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Articles