A wavelet-Galerkin method for solving population balance equations

A novel wavelet-Galerkin method tailored to solve parabolic equations in "nite domains is presented. The emphasis of the paper is on the development of the discretization formulations that are speci"c to "nite domain parabolic equations with arbitrary boundary conditions based on weak form functiona

## 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

While wavelets have proved effective in signal and image processing, the utility of wavelets in the numerical solutions of differential equations is currently being studied by several investigators. In the place of conventional Fourier or Legendre bases, wavelet bases are tried in the application of

We use vector-valued multiwavelets on compact sets to develop a Galerkin method for systems of integral equations of the second kind. We propose a compression strategy for the coeflieient matrix of the linear system obtained from this method and show that the compressed scheme preserves almost optim