Introduction to “Contour Dynamics for the Euler Equations in Two Dimensions”

tour dynamics (CD) for inviscid incompressible fluids in two dimensions. We present a contour dynamics algorithm for the Euler equations of fluid dynamics in two dimensions. This is applied to regions of The CD method does not use an underlying lattice and piecewise-constant vorticity within finit

It is well known that the Euler equations in two spatial dimensions have global classical solutions. We provide a new proof which is analytic rather than geometric. It is set in an abstract framework that applies to the so-called lake and the great lake equations describing weakly non-hydrostatic ef

In the design of fast multipole methods (FMM) for the numerical solution of scattering problems, a crucial step is the diagonalization of translation operators for the Helmholtz equation. These operators have analytically simple, physically transparent, and numerically stable diagonal forms. It has

In this paper we consider a passive scalar transported in two-dimensional flow. The governing equation is that of the convection-diffusion-reaction equation. For purposes of computational efficiency, we apply an alternating-direction implicit scheme akin to that proposed by Polezhaev. Use of this im

We consider the blowup solution (u, n, v)(f) of the Zakharov equations