Adapted BDF algorithms applied to parabolic problems

## Convergence of BDFs applied to nonlinear stiff initial value problems We present bounds for the global errors of backward differentiation formulas (BDFs) applied to non-autonomous stiff problems y = A(t)y + Φ(t) and outline the analysis for convergence of BDFs applied to rather general nonlinea

discover The Benefits Of Applying Algorithms To Solve Scientific, Engineering, And Practical Problems Providing A Combination Of Theory, Algorithms, And Simulations, Handbook Of Applied Algorithms Presents An All-encompassing Treatment Of Applying Algorithms And Discrete Mathematics To Practi

## Abstract A major problem in using the finite element method for solving numerous engineering problems in the framework of single‐ and multiphase materials is the assessment of discretization errors and the design of suitable meshes. To overcome this problem, adaptive finite element methods have

This paper describes an adaptive hp-version mesh reÿnement strategy and its application to the ÿnite element solution of one-dimensional ame propagation problems. The aim is to control the spatial and time discretization errors below a prescribed error tolerance at all time levels. In the algorithm,

A fast and efficient adapti¨e sampling algorithm is presented. This algorithm is applied to the aggressi¨e space mapping technique to minimize the number and to automate the selection of frequency sample points of the fine model, thus impro¨ing the efficiency of space mapping. The new technique is a