In this talk I will be presenting the main highlights of what I consider a very important development in the Medical Sciences for acquiring a much better understanding of the human body by demonstrating how the unique mathematical properties of  SDF  would play a very significant role in the development of more advanced and reliable theoretical models  for the human body.   This would require performing a complete analysis only on those  "general"  analytical solutions   that can be obtained using the very unique computational feature of  SDF  on  the  Naiver-Stokes equations for the  "Mechanical"  aspect of the human body that is largely influenced from the general Mechanical properties of fluids    and on the Schrodinger equation for the “Chemical”  aspect of the human body.

Currently there exist no such advanced theoretical models of  the human body that would be  based entirely on general analytical solutions of  PDEs because of  the severe limitation of Calculus  which if successfully resolved by the method of  SDF would become immeasurable in terms of reducing our excessive dependency on the use of experimental models in favor of a more universal algebraic theory for the  Physical and Biological Sciences.