Numerical solution of nonlinear partial differential equations with the Tau method

AbstraetqWe discuss a direct formulation of the Tau Method in two dimensions which differs radically from former techniques in that no discretization is introduced in any of the variables. A segmented formulation in terms of Tau elements is discussed and applied to the numerical solution of nonlinea

We discuss a hybrid approach which uses the Tau Method in combination with the Method of Lines and treat a number of eigenvalue problems defined by partial differential equations with constant and variable coefficients, on rectangular or circular domains and with the eigenvalue parameters entering i

This work develops fast and adaptive algorithms for numerically solving nonlinear partial differential equations of the form u t ϭ Any wavelet-expansion approach to solving differential L u ϩ N f (u), where L and N are linear differential operators and equations is essentially a projection method. I

We describe a wavelet collocation method for the numerical solution of partial differential equations which is based on the use of the autocorrelation functions of Daubechie's compactly supported wavelets. For such a method we discuss the application of wavelet based preconditioning techniques along