ABSTRACT
This chapter examines the system of coupled differential equations governing the motion of slow, nonstationary flow of micropolar fluids. It discusses the basic equations governing the flow, and, using the method and derives a reciprocal theorem. The fundamental singular solution is then derived in two-dimensional regions and the integral representation of the solution of the motion is given. The integral representation for the solution of equations that govern steady flow of incompressible micropolar fluids was considered by M. Ramkissoon and S. R. Majumdar and L. Dragos and D. Homentcovschi. It is desirable for some aspects of hydrodynamical problems and for the proof of existence of solutions to have integral representations of solutions.
