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Copyright:
1996-2010
J.A. Sethian

MOVING INTERFACES AND BOUNDARIES

LEVEL SET METHODS and FAST MARCHING METHODS

J.A. SETHIAN

Dept. of Mathematics, Univ. of California, Berkeley, California 94720
E-mail: sethian@math.berkeley.edu

Fast Marching Methods and Level Set Methods are numerical techniques which can follow the evolution of interfaces. These interfaces can develop sharp corners, break apart, and merge together. The techniques have a wide range of applications, including problems in fluid mechanics, combustion, manufacturing of computer chips, computer animation, image processing, structure of snowflakes, and the shape of soap bubbles.

These are two fundamentally different approaches to the problem of tracking moving interfaces, yet they share a common theory and numerical methodology. This web page serves as both an introductory and advanced resource for these ideas, with the goal of providing

an intuitive understanding of the techniques
the history, evolution, and application of these methods
technical details and reference material.

Robotic Navigation (a little taste of what's in these pages)

APPLICATIONS

Geometry

Soap Bubbles

Medical Scans

Robotics

Fluids

Semiconductors

Wave Propagation

Noise Removal

OptimalDesign

Seismic Analysis

Tumor Modeling

Optimal Control

InkJet Plotters

Continuous Traveling Salesmen

ViscoElastic Flow

Chemical Pathways

Droplet Pinchoff

Further Information about Level Set Methods:
If you would like me to mail (physical mail) you more information, please fill in the information below: (* German translation courtesy of azoft)

MOVING INTERFACES AND BOUNDARIES

J.A. SETHIAN

Dept. of Mathematics, Univ. of California, Berkeley, California 94720 E-mail: sethian@math.berkeley.edu

Dept. of Mathematics, Univ. of California, Berkeley, California 94720
E-mail: sethian@math.berkeley.edu