Robert L. Dawes
May, 1977 The University of Texas at Austin
Texas Instruments, Martingale Res. Corp., QED Corp.
A degenerate evolution equation for fluid flow in multi-porous media
Martin M. Rooney
December, 1977 The University of Texas at Austin
University Central Oklahoma, MATLAB
Numerical analysis of nonlinear wave equations
Emmanuele DiBenedetto
August, 1979 The University of Texas at Austin
Indiana University, Northwestern, Vanderbilt University
Implicit degenerate evolution equations
Kenneth L. Kuttler
December, 1980 The University of Texas at Austin
Michigan Tech. Univ., Brigham Young University
Degenerate evolution inequalities
Jim Rulla
September, 1985 The University of Texas at Austin
N.C. State University, Arkansas College, Pacific University
A Stefan problem with prescribed convection (Best Dissertation Award)
Marie-Pascale Bosse
August, 1987 The University of Texas at Austin
Iowa State University, A.T.&T., ALC-TEL
Homogenization of the layered medium equation
Seth Oppenheimer
December, 1987 The University of Texas at Austin
Mississippi State University
Dynamics of gas absorption
Noel Walkington
May, 1988 The University of Texas at Austin
Carnegie - Mellon University
Resolution of a diffusion problem arising in the flow of fluids
Xingsheng Xu
August, 1988 The University of Texas at Austin
University of Arkansas, Mississippi State University
The continuous dependence of solutions to a Cauchy problem
Lindsay Packer
August, 1992 The University of Texas at Austin
Charleston College, MSU Denver
The regularized layered medium equation
Gordon Clark
August, 1992 The University of Texas at Austin
Virginia Commonwealth University, TCS Management
Microstructure modeling of fluid flow in a layered medium
John D. Cook
August, 1992 The University of Texas at Austin
Vanderbilt University, Western Atlas, MD Anderson Biostat, John D. Cook Consulting, University of Houston
Diffusion models with microstructure and secondary flux
Thomas Little
August, 1993 The University of Texas at Austin
Courant Inst, IMA, Columbia, Deutsche Bank
Semilinear parabolic equations with Preisach Hysteresis
Brooke Hollingsworth
August, 1994 The University of Texas at Austin
Semilinear degenerate parabolic systems and distributed capacitance models
Laura Lochhead Rock
December, 1996 The University of Texas at Austin
ITT (Seattle)
A coupled system of semilinear parabolic equations with hysteresis
Hee Chul Pak
December, 1999 The University of Texas at Austin
Sogang University, Dankook University
Two Distributed Capacitance Models
Bahareh Momken
December, 2000 The University of Texas at Austin
Avaya Communications
Fluid Flow and Deformation in Composite Porous Media
Darrin Visarraga
August, 2001 The University of Texas at Austin
University of Texas, Los Alamos National Lab
Heat Transport Models with Distributed Microstructure
Fernando Morales
June, 2011 Oregon State University
Universidad Nacional de Colombia, Sede Medellin
Multiscale Analysis of Saturated Flow in a Porous Medium with Adjacent Thin Channel
Eleanor Holland
September, 2018 Oregon State University
Oregon State University
Modeling Porosity: the Visco-Elastic Edition
Alireza Hosseinkhan
June, 2022 Oregon State University
Macalester College, UC Santa Barbara
The Biot System with Unilateral Displacement Constraints