DYNAMIC ANALYSIS OF MATHEMATICAL MODEL OF GLUCOSE, INSULIN CONCENTRATION, AND BETA SELECT CYCLES OF DIABETES MELLITUS DISEASE
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Abstract
This study examines the relationship between the components of glucose , insulin and beta cells ( in the body by looking at the genetic predisposition ( ). The three components are very important for the body. The body requires glucose from food which is then converted into energy and partially stored in muscle or liver. Excess glucose in the blood will be balanced by insulin from beta cells in the pancreas.
The focus studied is the dynamic analysis of the three components. The benefit of this research is know the stability behavior for glucose, insulin and beta cells. The results of this study obtained an equilibrium point consisting of three things: the point of pathological equilibrium, susceptible to disease and physiological. And stability analysis is consist of stable and unstable. And the behavior of glucose, insulin and beta cells of the model can be known through phase and simulation fields. For further research is expected to analyze the model by changing the initial value.
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References
Barnes, B., & Fulford. (2002). Mathematical Modelling with Case Studies: A Differential Equations Approach Using Maple and Matlab, Second Edition. Taylor & Francis.
Ladas, F. d. (1988). Persamaan Diferensial Biasa dengan Penerapan Modern. Jakarta: Erlangga.
Maryam, U. (2009). Penerapan Model Matematika pada Konsianat dari Leukosit. Malang: UIN Maulana Malik Ibrahim Malang.
Musta’adah, E. (2004). Aplikasi Titik Tetap pada Penyelesaian PDB. Malang: UIN Maulana Malik Ibrahim.
Topp, B., Promislow, K., Vries, D., Miura, & Finegood, d. D. (2000). A Model of ß-Cell Mass, Insulin, and Glucose Kinetics: Pathways to Diabetes. Journal of Theoretical Biology, 206, 605-619.
Waluyo, S. B. (2006). Persamaan Diferensial. Yogyakarta: Graha Ilmu.