Skip to Content

1978

1978 Texas Partial Differential Equations Seminar
University of Texas at Austin

    March 18, 1978. (In order of presentation).
  • John Dollard: University of Texas at Austin; Product integration and evolution equations.
  • Charles Friedman: University of Texas at Austin; Asymptotic behavior and product integrals.
  • S. Bernfeld: University of Texas at Arlington; Periodic solutions of a class of nonlinear differential equations.
  • Bob Hunt: Texas Tech. University; Tangential Cauchy-Riemann equations.
  • G. Knightly: University of Massachusetts; Behavior at infinity of solutions of the Navier-Stokes equation.
  • W. Rundell: Texas A & M University; Uniqueness classes for the Cauchy problem for pseudoparabolic equations.
  • M. Strauss: Texas Tech. University; Uniqueness in the Cauchy problem.
  • Linda J. Hayes: University of Texas at Austin; Numerical techniques for nonlinear parabolic equations using patch approximations.
  • J. Neuberger: North Texas State University; Iterative methods for systems of nonlinear p.d.e.'s.
  • J. Eisenfeld: University of Texas at Arlington; Inverse problems in differential equations.
  • Peter Bates: Pan American University; Hilbert space methods for nonlinear systems of p.d.e.'s.
  • J. R. Ward: Pan American University; Existence of solutions for some nonlinear equations and applications.
  • L. Salvadori: University of Texas at Arlington; Attractivity and Hopf bifurcation.
  • Wayne Ford: Texas Tech. University; Porous media problems.
  • Steve Fulling: Texas A & M University; Differential equations and the construction of states and observables in linear quantum field theories.
  • Chris Cosner: Texas A & M University; Degenerate second order elliptic systems.
  • M. Cantor: University of Texas at Austin; Boundary value problems for asymptotically homogeneous elliptic operators on exterior regions.
  • V. Alexiades: University of Texas at Austin; Singular perturbations and singular parabolic p.d.e.'s.
  • R. Bank: University of Texas at Austin; Optimal order process for solving finite element equations (with Todd Dupont, University of Chicago).
  • Andy Sherman: University of Texas at Austin; Computational aspects of multi-grid methods.