Skip to main content
U.S. flag

An official website of the United States government

Official websites use .gov
A .gov website belongs to an official government organization in the United States.

Secure .gov websites use HTTPS
A lock ( ) or https:// means you’ve safely connected to the .gov website. Share sensitive information only on official, secure websites.

An a posteriori Error Estimate for Scanning Electron Microscope Simulation with Adaptive Mesh Refinement

Published

Author(s)

William F. Mitchell, John S. Villarrubia

Abstract

The intensity variation in a scanning electron microscope is a complex function of sample topography and composition. Measurement accuracy is improved when an explicit accounting for the relationship between signal and measurand is made. Because the determinants of the signal are many, the theoretical understanding usually takes the form of a simulator. For samples with nonconducting regions that charge, one phase of the simulation is finite element analysis to compute the electric field. The size of the finite element mesh, and consequently computation time, can be reduced through the use of adaptive mesh refinement. We present a new a posteriori local error estimator and adaptive mesh refinement algorithm for the scanning electron microscope simulation. This error estimate is designed to minimize the error in the electron trajectories, rather than the energy norm of the error that traditional error estimators minimize. Using a test problem with a known exact solution, we show that the adaptive mesh can achieve the same error in electron trajectories as a carefully designed hand-graded mesh while using 3.5 times fewer vertices and 2.25 times less computation time.
Citation
Journal of Scientific Computing
Volume
80
Issue
3

Keywords

adaptive mesh refinement, a posteriori error estimation, scanning electron microscope simulation, finite element analysis

Citation

Mitchell, W. and Villarrubia, J. (2019), An a posteriori Error Estimate for Scanning Electron Microscope Simulation with Adaptive Mesh Refinement, Journal of Scientific Computing, [online], https://doi.org/10.1007/s10915-019-00995-2, https://tsapps.nist.gov/publication/get_pdf.cfm?pub_id=925561 (Accessed December 26, 2024)

Issues

If you have any questions about this publication or are having problems accessing it, please contact reflib@nist.gov.

Created July 7, 2019, Updated October 12, 2021