A convergent ‘farfield’ expansion for two-dimensional radiation functions

Expansion functions are presented for two-dimensional incompressible fluid flow in arbitrary domains that optimally conserve the 2D structure of vortex dynamics. This is obtained by conformal mapping of the domain onto a circle and by constructing orthogonal radial polynomials and angular harmonics

Figure 3 Comparison of the normalized phase velocity computed w x by using the new expression of and the expression in 1 with r, eff, p the measurements Figure 4 Comparison of the interaction impedance computed by w x using the new expression of and the expression in 1 with the r, eff, p measurement

When investigating the acoustic or vibrational behaviour of a two-or three-dimensional system, the classical approach is to compute the response as a sum over all contributing modes. In this paper the modal summation of a two-dimensional system is rearranged, taking into account the physical nature

Galerkin and Petrov Galerkin linite element mellods are used to obtain new linite difference schemes for the solution of linear twodimensional convection difusion problems. Numerical estimates are made of the rates of convergence of these schemes, uniformly with respect to the perturbation parameter

A generalized asymptotic expansion in the far field for the problem of cylindrical wave reflection at a homogeneous impedance plane is derived. The expansion is shown to be uniformly valid over all angles of incidence and values of surface impedance, including the limiting cases of zero and infinite

## Abstract A new formalism combining modal expansions based on perfectly matched layers (PMLs) and on Floquet modes is proposed to derive a fast‐converging series expansion for the 2D Green's function of layered media. The PML‐based modal expansion is obtained by terminating the waveguide, formed