Mathematical models for the secretion of estradiol and progestrone due to womens stress

Abstract

As we all know that modeling is an activity, a cognitive activity in which we think about and make models to describe how devices or objects of interest behave. There are many ways in which devices and behaviors can be described. We can use words, drawings or sketches, physical models, computer programs, or mathematical formulas. In other words, the modeling activity can be done in several languages, often simultaneously. Mathematical model proposed in the synopsis discuss the complex cross disciplinary interaction among the various domain involved in biological and mathematics to formalize the biological system in rational form. Stress in this context, is regarded as a process of transactions between the individual and his environment and hormonal measurements are seen as tools by which new insights can be gained into dynamics of these transactions. The duration of these response evoked by temporary disturbances in daily life is a key determinant of their potential harmfulness. It is necessary to propose a mathematical formulation of the key process and interaction among them. These approach helps us to study from the mathematical point of view the property arising from the mathematical modeling. The mathematical models helps us to know how to make or generate mathematical representations or models, how to validate them, how to use them, and how and when their use is limited. Mathematical model may be too simple to analyze the interesting behavior or at the opposite extreme too complex to be well understood. These mathematical objects helps us to study the behavior of the biological system accepting a limiting knowledge of the dynamic behaviour of the mathematical model. These helps in reducing the complexity of the mathematical model keeping the richness of it dynamics. These mathematical models helps in further algebraic treatment and can be extended to topological field.