1984 Texas Partial Differential Equations Seminar
Southwest Texas State University, San Marcos.
Saturday March 3, 1984. (In order of presentation).
- J. Neuberger: North Texas State Univ.;
Applications of the steepest descent method to differential equations
with nonlinear boundary conditions.
- R.E. Showalter: Univ. of Texas at Austin;
A hyperbolic PDE
- I.J. Bakelman:Texas A&M Univ.;
Non-uniform elliptic PDE's and applications to plasticity and
differential geometry problems.
- A. Castro: Southwest Texas State Univ. ;
Uniqueness of positive solutions for a Dirichlet problem when a parameter
is large.
- P. Vuillermot: Univ. of Texas at Arlington;
A class of elliptic PDE with exponential nonlinearities.
- B.L. Keyfitz: Univ. of Houston;
Bifurcation in a reaction-diffuction equation under changes in domain.
- R.L. Foote: Texas Tech Univ.;
Differential geometry of one-dimentional real Monge-Ampere Foliations.
- K. Hollig & M. Pilant*:Texas A&M Univ.;
Regularity of the free boundary for the one-dimentional porous medium
equation.
Lunch break
- H. Engler: Univ. Texas at Austin;
Contractive properties of the heat equation in W1,p and
applications to Hamiton-Jacobi equations.
- R. Kannan & R. Ortega: Univ. of Texas at Arlington;
An approximate integration scheme applied to a system of semilinear
hyperbolic equatoins.
- D.X. Nguyen: Texas Tech Univ.;
Self-adjointness for general elliptic operators with Sobolev-type
coefficients.
- J. Walsh: Southwest Texas State Univ.;
Iterative solution of linear boundary value problems.
- D.S Levine: Univ. of Texas at Arlington;
Unbounded oscillatory solutions for a system of interacting populations.
- R. Kannan & R. Ortega: Univ. of Texas at Arlington;
Superlinear perturbations of linear elliptic boundary value problems
at resonance.
- R.D. Ogden: Southwest Texas State Univ.;
Fourier analysis and Differential-delay equations.
- M. Countryman: Lousiana Tech Univ.;
Numerical methods for damped nonlinear vibrations.
- W.O. Ray: Univ. of Oklahoma;
Perturbation of normaly solvable operators.
- L.D. Drager:Texas Tech Univ.;
W. Layton: Georgia Institute of technology;
Delay differential equations and function algebras.
- B. Perry: Texas A&M Univ.;
Numerical method for problems in catalysis.
- A. Boggess: Texas A&M Univ.;
Analytic hypoanalycitity.
- R. Shivaji: Southwest Texas State Univ.:
Multiple solutions for a Dirichlet problem with jumping nonlinearities.
- D. Wagner: Univ. of Houston;
A new approach to the existence of deflagration waves.
- P. Smith: Texas A&M Univ.;
Regularity of minima of a nonconvex functional
- M.C. Pandian: Univ. of Texas at Arlington;
Numerical solutions of a quisilinear elliptic problem in lubrication
theory.
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