The method of particular solutions for solving scalar wave equations

The advection±dispersion equation with spatially variable coecients does not have an exact analytical solution and is therefore solved numerically. However, solutions obtained with several of the traditional ®nite dierence or ®nite element techniques typically exhibit spurious oscillation or numeric

## Abstract A new numerical scheme is proposed for solving general dynamic population balance equations (PBE). The PBE considered can simultaneously include the kinetic processes of nucleation, growth, aggregation and breakage. Using the features of population balance, this method converts the PBE

The computational e$ciency of "nite elements using Chebyshev basis functions is compared with that of standard equispaced lower order (bilinear and biquadratic) and higher order (bicubic and greater) pelements in the solution of the two-dimensional scalar wave equation when using explicit time integ