Fast factorization method for implicit cube set representation

A factorisation method is described for the fast numerical solution of constant tridiagonal. Toeplitz linear systems which occur repeatedly in the solution of the implicit finite difference equations derived from linear first order hyperboZic equations, i.e. the Transport equation, under a variety o

A. Pearson, FRS, who, 15 years ago, recognized that incorporating the relevant tip asymptotics in hydraulic fracture simulators is critical for the

A method is introduced to decrease the computational labor of the standard level set method for propagating interfaces. The fast approach uses only points close to the curve at every time step. We describe this new algorithm and compare its efficiency and accuracy with the standard level set approac

We propose a finite-difference algorithm for solving the time-dependent Ginzburg-Landau (TDGL) equation coupled to the appropriate Maxwell equation. The time derivatives are discretized using a second-order semi-implicit scheme which, for intermediate values of the Ginzburg-Landau parameter , allows