1991 Joint Mathematics Meetings, Program by Special Session
AMS Meeting Program by Special Session
Current as of Tuesday, April 12, 2005 15:08:48
1991 Joint Mathematics Meetings
San Francisco, CA, January 16-19, 1991
Andy R Magid, AMS firstname.lastname@example.org
Kenneth A Ross, MAA email@example.com
AMS Special Session on Geometric Fourier Analysis
Friday January 18, 1991, 12:00 p.m.-3:20 p.m.
AMS Special Session on Geometric Fourier Analysis, I
Comparison theorems for P.D.E.'s on tori.
Albert Baernstein, II*, Washington University
Weakly elliptic systems with obstacle constraints.
David R. Adams*, University of Kentucky
Conformally invariant inequalities and conformally covariant differential operators.
Thomas P. Branson*, University of Iowa
Sobolev inequality of Moser-Trudinger type.
Sun-Yung Alice Chang*, University of California, Los Angeles
K-parameter Fourier analysis.
Elias M. Stein*, Princeton University
Sharp constants for the Fourier transform and other Gaussian kernels.
Elliott H. Lieb*, Princeton University
Sobolev inequalities and conformal geometry.
Jose F. Escobar*, Indiana University, Bloomington
Saturday January 19, 1991, 7:00 a.m.-9:50 a.m.
AMS Special Session on Geometric Fourier Analysis, II
Layer potentials and regularity of solutions to transmission problems with internal Lipschitz boundaries.
Eugene Fabes*, University of Minnesota, Minneapolis
On the solvability of elliptic partial differential equations.
Robert Fefferman*, University of Chicago
Competing symmetries and extremals for geometric functionals.
Eric A. Carlen*, Princeton University
Conformally invariant powers of the Laplacian.
C. Robin Graham*, University of Washington
Ground-state energy of large atoms.
Charles Fefferman*, Princeton University
Analytic non-hypoellipticity of overline partial _b.
Michael Christ*, University of California, Los Angeles
Daryl Geller, State University of New York, Stony Brook
Saturday January 19, 1991, 12:00 p.m.-4:20 p.m.
AMS Special Session on Geometric Fourier Analysis, III
Harmonic measure for the exterior of a convex domain.
David Jerison*, Massachusetts Institute of Technology
Some non-linear problems related to harmonic measure.
Peter Jones*, Yale University
Daniel W. Stroock*, Massachusetts Institute of Technology
Estimates for homogeneous and inhomogeneous boundary value problems.
Carlos E. Kenig*, University of Chicago
On the circular maximal function.
Gerd Mockenhaupt*, University of California, Los Angeles
The Neumann problem for second order divergence form elliptic operator.
Jill Pipher*, Brown University
Averages over convex hypersurfaces.
Andreas Seeger*, Princeton University
Alexander Nagel, University of Wisconsin, Madison
Stephen Wainger, University of Wisconsin, Madison
Problems related to local smoothing of Fourier integral operators.
Christopher D. Sogge*, University of California, Los Angeles
Lewy's harmonic gradient mappings in higher dimensions.
Stewart Gleason, Prudential Reinsurance Company, Newark, New Jersey
Thomas Wolff*, California Institute of Technology