The fourier-chebyshev spectral method for solving two-dimensional unsteady vorticity equations

We describe a method for solving the two-dimensional Navier-Stokes equations in irregular physical domains. Our method is based on an underlying uniform Cartesian grid and second-order finite-difference/finite-volume discretizations of the streamfunction-vorticity equations. Geometry representing st

We present a new iterative Chebyshev spectral method for solving the elliptic equation \(\nabla \cdot(\sigma \nabla u)=f\). We rewrite the equation in the form of a Poisson's equation \(\nabla^{2} u=(f-\nabla u \cdot \nabla \sigma) / \sigma\). In each iteration we compute the right-hand side terms f

## Abstract A fourth‐order compact finite‐difference method is proposed in this paper to solve the system of two‐dimensional Burgers' equations. The new method is based on the two‐dimensional Hopf–Cole trans‐formation, which transforms the system of two‐dimensional Burgers' equations into a linear