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Real, Harmonic, and Functional Analysis
[ math page ] ...[ grad
page ] ...[
research page ]
- Sergey Bobkov ... [ bobkov@math.umn.edu]
Professor, Ph.D. 1988 Leningrad University
geometric and functional inequalities, concentration of measure and isoperimetry
- George Brauer ... [ brauer@math.umn.edu]
Associate Professor Emeritus, Ph.D. 1954 University of Michigan
functional analysis, series, real variables
- Paul Garrett ... [
garrett@math.umn.edu ]
Professor, Ph.D. 1977 Princeton University
automorphic forms, L-functions,
representations, harmonic analysis, number theory
- Max Jodeit, Jr. ... [
jodeit@math.umn.edu ]
Professor Emeritux, Ph.D. 1967 Rice University
harmonic analysis, singular integral operators
- Markus Keel... [
keel@math.umn.edu ]
Professor, Ph.D. Princeton University
partial differential equations; real, harmonic, and functional analysis
- Gilad Lerman ... [
lerman@math.umn.edu ]
Professor Emeritus, Ph.D. 2000 Yale University
computational harmonic analysis, analysis of large data sets and statistical learning, bio-informatics
- Charles McCarthy ... [ mccar003@math.umn.edu]
Associate Professor, Ph.D. 1959 Yale University
functional analysis, applications of operator theory
- Norman Meyers ... [
meyers@math.umn.edu ]
Professor Emeritus, Ph.D. 1957 Indiana University
applied mathematics and functional analysis
- Chester Miracle ... [ miracle@math.umn.edu]
Associate Professor, Ph.D. 1959 University of Kentucky
mathematics education, harmonic analysis
- Hoai Minh Nguyen... [
hmnguyen@math.umn.edu ]
Assistant Professor, Ph.D. 2007 Universite Paris VI-Pierre et Marie Curie
partial differential equations, calculus of variations, and applied math.
