1992 Joint Mathematics Meetings, Program by Special Session
Joint Mathematics Meetings Program by Special Session
Current as of Tuesday, April 12, 2005 15:08:55
1992 Joint Mathematics Meetings
Baltimore, MD, January 8-11, 1992
Lance W Small, AMS email@example.com
Kenneth A Ross, MAA firstname.lastname@example.org
AMS Special Session on Function Theoretic Methods in Partial Differential Equations
Friday January 10, 1992, 1:00 p.m.-4:10 p.m.
AMS Special Session on Function Theoretic Methods in Partial Differential Equations, I
Half Dirichlet problems for the Dirac operator in the unit ball of R^n.
Heinrich Begehr*, Freie University of Berlin, Germany
Z. Xu, Fudan University, China
The planar oil cap problem.
Robert P. Gilbert*, University of Delaware
Guo-Chun Wen, Peking University, China
On the use of Bergman operators in the theory of minimal surfaces.
Erwin O. Kreyszig*, Carleton University,
Reproducing kernel methods for ill-posed problems involving partial differential operators.
M. Zuhair Nashed*, University of Delaware
Analytic representations with wavelet expansions.
Gilbert G. Walter*, University of Wisconsin, Milwaukee
Sampling theorems associated with Dirichlet and Neumann problems for Schrodinger equation.
Ahmed I. Zayed*, University of Central Florida
A simple solution method for the first boundary value problem of the polyharmonic equation.
Steven H. Schot*, American University
Saturday January 11, 1992, 8:00 a.m.-11:00 a.m.
AMS Special Session on Function Theoretic Methods in Partial Differential Equations, II
Applications of function theoretic methods.
Peter A. McCoy*, United States Naval Academy
Intrinsic Dirac operators in C^n.
John Ryan*, University of Arkansas, Fayetteville
A function theoretic method for inhomogeneous second order elliptic systems and its applications to thermo-elastic problems.
Yongzhi Xu*, University of Minnesota, Minneapolis
Gradients derived by variational means.
J. W. Neuberger*, University of North Texas
The two-dimensional stability of plane couette flow.
Isom H. Herron*, Howard University
Uniform stabilization of planar networks of Timoshenko beams.
John E. Lagnese*, Georgetown University