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J. T. Oden

Bio: J. T. Oden is an academic researcher from University of Texas at Austin. The author has contributed to research in topics: Finite element method & Mixed finite element method. The author has an hindex of 53, co-authored 269 publications receiving 16064 citations. Previous affiliations of J. T. Oden include University of Alabama & Oklahoma State University–Stillwater.


Papers
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Book
01 Jan 1987
TL;DR: Signorini's problem revisited Signorini problem for incompressible materials Alternate variational principles for Signorinis problem Contact problems for large deflections of elastic plates Some special contact problems with friction Contact problems with nonclassical friction laws Contact problems involving deformations and nonlinear materials Dynamic friction problems Rolling contact problems Concluding comments.
Abstract: Introduction Signorini's problem Minimization methods and their variants Finite element approximations Orderings, Trace Theorems, Green's Formulas and korn's Inequalities Signorini's problem revisited Signorini's problem for incompressible materials Alternate variational principles for Signorini's problem Contact problems for large deflections of elastic plates Some special contact problems with friction Contact problems with nonclassical friction laws Contact problems involving deformations and nonlinear materials Dynamic friction problems Rolling contact problems Concluding comments.

1,669 citations

Journal ArticleDOI
TL;DR: In this paper, a large body of experimental and theoretical literature on friction is critically reviewed and interpreted as a basis for models of dynamic friction phenomena, and a continuum model of interfaces is developed which simulate key interface properties identified in Part I.

803 citations

Book
01 Jan 1971
TL;DR: The Methode des elements finis reference record was created on 2004-09-07, modified on 2016-08-08 as mentioned in this paper, and was used for the reference record.
Abstract: Keywords: Methode des elements finis Reference Record created on 2004-09-07, modified on 2016-08-08

776 citations

Book
01 Jan 1976
TL;DR: On Engineering By J T Oden J N Reddy ONLINE SHOPPING for NUMBER InTRODUCTION
Abstract: On Engineering By J T Oden J N Reddy ONLINE SHOPPING FOR NUMBER INTRODUCTION AN INTRODUCTION. MATHEMATICAL LEARNING THEORY R C ATKINSON. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF INVERSE. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF FINITE. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF WAVES. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF INVERSE. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF THE NAVIER. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF VIBRATIONS. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF INVERSE. INTRODUCTION MATHEMATICAL THEORY FINITE ELEMENTS ABEBOOKS. AN INTRODUCTION TO THE MATHEMATICAL THEORY OF WAVES. AN INTRODUCTION TO THE

686 citations


Cited by
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Journal ArticleDOI
TL;DR: This survey is the first to bring to the attention of the controls community the important contributions from the tribology, lubrication and physics literatures, and provides a set of models and tools for friction compensation which will be of value to both research and application engineers.

2,658 citations

Book
01 Jan 2000
TL;DR: In this paper, a summary account of the subject of a posteriori error estimation for finite element approximations of problems in mechanics is presented, focusing on methods for linear elliptic boundary value problems.
Abstract: This monograph presents a summary account of the subject of a posteriori error estimation for finite element approximations of problems in mechanics. The study primarily focuses on methods for linear elliptic boundary value problems. However, error estimation for unsymmetrical systems, nonlinear problems, including the Navier-Stokes equations, and indefinite problems, such as represented by the Stokes problem are included. The main thrust is to obtain error estimators for the error measured in the energy norm, but techniques for other norms are also discussed.

2,607 citations

Book
28 May 1996
TL;DR: Introduction.
Abstract: Introduction. A Simple Model Problem. Abstract Nonlinear Equations. Finite Element Discretizations of Elliptic PDEs. Practical Implementation. Bibliography. Subject Index.

2,253 citations

Journal ArticleDOI
TL;DR: A large selection of solution methods for linear systems in saddle point form are presented, with an emphasis on iterative methods for large and sparse problems.
Abstract: Large linear systems of saddle point type arise in a wide variety of applications throughout computational science and engineering. Due to their indefiniteness and often poor spectral properties, such linear systems represent a significant challenge for solver developers. In recent years there has been a surge of interest in saddle point problems, and numerous solution techniques have been proposed for this type of system. The aim of this paper is to present and discuss a large selection of solution methods for linear systems in saddle point form, with an emphasis on iterative methods for large and sparse problems.

2,253 citations