Discrete Singular Convolution–Finite Subdomain Method for the Solution of Incompressible Viscous Flows

This paper proposes a discrete singular convolution-finite subdomain method (DSC-FSM) for the analysis of incompressible viscous flows in multiply connected complex geometries. The DSC algorithm has its foundation in the theory of distributions. A block-structured grid of fictitious overlapping inte

boundary. Recently, this result was improved in [15] to show second-order convergence of solutions including Thom's vorticity condition for solving the incompressible Navier-Stokes equations is generally known as a first-order method since boundary vorticity for the steady Stokes equations using the

The linear stability of incompressible flows is investigated on the basis of the finite element method. The two-dimensional base flows computed numerically over a range of Reynolds numbers are perturbed with three-dimensional disturbances. The three-dimensionality in the flow associated with the sec