Elementos Finitos por autores

Vlacev TE · 24 de February de 2010, 07:47:12 PM

El objetivo de este tema será el publicar autores e investigadores sobre Elementos Finitos, para que los interesados puedan guiarse a la hora de buscar bibliografía.

Professor Mark Ainsworth

Research Interests

Numerical analysis of partial differential equations
My research is in the area of numerical analysis of partial differential equations arising in physical sciences. The name of the game is to take a cheap (and often nasty) initial approximation, then, by looking at where the accuracy is unacceptable, design a new approximation by adaptively feeding back information. By continuing in this way, it is possible to end up with a near optimal approximation. At the very least, this can save vast amounts of computer time, or may mean the difference between getting an answer or not in some cases.

Publicaciones en Scientific Commons

Professor Ivo Babuska

Research Interests :

- Numerical Solution of Partial Differential Equations
- Computational Problems of Solid Mechanics
- Theory of Partial Differential Equations

Dr. Babuska specializes in numerical solution of partial differential equations, especially the finite element method, and applied mathematics in general. His major field of application is continuum mechanics.

Publicaciones en Scientific Commons

Timothy J. Baker

Publicaciones

N. Sukumar

Research Interests

I am a member of the Structural Engineering and Structural Mechanics (SESM) faculty at UC Davis, and also a member of the Graduate Group in Applied Mathematics. My research interests lie in the areas of computational solid mechanics and applied mathematics, with recent emphasis on new methods development for failure modeling in materials and in ab initio electronic-structure (Kohn-Sham equations of DFT) calculations. I have been involved in the development of meshfree (natural neighbor) and partition of unity finite element methods. Other areas of interest and current research emphasis include computational geometry, level set methods, information theory, Bayesian theory of probability, maximum entropy methods in mechanics, bone fracture, constrained optimization and variational analysis, adaptive mesh refinement, and scientific computing. I am currently working on a few funded projects. Prior to UCD, I was a research associate at Princeton; Ph.D. in Theoretical and Applied Mechanics from Northwestern [web], M.S. from OGI, and B.Tech. from IIT Bombay (H6).

Publicaciones
+ Publicaciones

Ted Belytschko

Research Interests

Professor Belytschko is interested in computational methods for modeling the behavior of solids, with particular emphasis on failure and fracture. He has developed new meshfree methods and the extended finite element method for modeling arbitrary crack growth without remeshing and applied them to a variety of crack growth problems, both static and dynamic. He is also using molecular mechanics to study the fracture and behavior of nanotubes and developing methods for coupling heterogeneous subdomains, such as molecular and continuum models.

Publicaciones