The case of Neumann, Robin and periodic lateral condition for the semi infinite generalized Graetz problem and applications
This work offers a theoretical foundation for solving convection-diffusion problems in pipes with various boundary conditions, benefiting engineers and applied mathematicians working on heat/mass transfer in fluid flows.
The paper provides a mathematical analysis of Neumann, Robin, and periodic lateral boundary conditions for the semi-infinite generalized Graetz problem, reducing the 3D problem to 2D eigenproblems. The analysis supports numerical methods for finite pipes, semi-infinite pipes, and exchangers of arbitrary cross section, with numerical tests demonstrating their capabilities.
The Graetz problem is a convection-diffusion equation in a pipe invariant along a direction. The contribution of the present work is to propose a mathematical analysis of the Neumann, Robin and periodic boundary condition on the boundary of a semi-infinite pipe. The solution in the 3D space of the original problem is reduced to eigenproblems in the 2D section of the pipe. The set of solutions is described, its structure depends on the type of boundary condition and of the sign of the total flow of the fluid. This analysis is the cornerstone of numerical methods to solve Graetz problem in finite pipes, semi infinite pipes and exchangers of arbitrary cross section. Numerical test-cases illustrate the capabilities of these methods to provide solutions in various configurations.