Algebrodynamic modeling in Partial Differential Equations formulated from the Oyibo grand unification theorem

The Oyibo grand unification theorem (GUT) has been proposed as a mathematical basis for a grand unification theory also known as the theory of everything. The Oyibo’s approach emanated from his methodology for solving the Navier Stokes equation in fluid mechanics using invariance of an arbitrary function under a group of conformal transformations.  In a recent study, we formulated a generic partial differential equations (PDE) from the Oyibo GUT and then recover some PDEs important to mathematical physics from it. Since there is consensus that PDEs describe many of the fundamental processes of the physical world, we have extended the recovery of PDEs important in fluid dynamics, structural modeling, electromagnetism and acoustics, from our generic PDE. The salient feature of this approach which we have emphasized in this study is that modeling is reduced to algebraic operations hence it can be considered as a new formation of algebrodynamic – algebraic nature of physical geometry and dynamics.