Carlos Kenig

E267194

Carlos Kenig is an Argentine-American mathematician renowned for his influential work in partial differential equations and harmonic analysis.

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Carlos Kenig canonical 1

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Predicate Object
instanceOf Argentine-American mathematician
human
mathematician
awardReceived Bôcher Memorial Prize
Leroy P. Steele Prize
surface form: Leroy P. Steele Prize for Mathematical Exposition

SASTRA Ramanujan Prize Committee Chair recognition
Wolf Prize in Mathematics
birthCountry Argentina
birthPlace Buenos Aires
countryOfCitizenship Argentina
United States of America
doctoralAdvisor Alberto Calderón
educatedAt University of Chicago
employer University of Chicago
familyName Kenig
fieldOfWork elliptic partial differential equations
free boundary problems
harmonic analysis
mathematics
nonlinear dispersive equations
partial differential equations
scattering theory
gender male
givenName Carlos
invitedSpeaker International Congress of Mathematicians
surface form: International Congress of Mathematicians 1986
languageSpoken English
Spanish
memberOf National Academy of Sciences of Argentina
surface form: Academia Nacional de Ciencias Exactas, Físicas y Naturales (Argentina)

American Academy of Arts and Sciences
National Academy of Sciences
surface form: National Academy of Sciences of the United States of America
name Carlos Eduardo Kenig
notableStudent Carlos E. Muñoz
Ciprian Demeter
Gigliola Staffilani
Luis Silvestre
notableWork work on boundary behavior of harmonic functions
work on global well-posedness and scattering for nonlinear dispersive equations
work on unique continuation for elliptic and parabolic equations
plenarySpeaker International Congress of Mathematicians
surface form: International Congress of Mathematicians 2010
positionHeld Louis Block Distinguished Service Professor of Mathematics at the University of Chicago
Professor of Mathematics at the University of Chicago
researchContribution advanced the study of nonlinear dispersive equations and their scattering behavior
contributed to the theory of free boundary problems
developed techniques in harmonic analysis applied to partial differential equations
made fundamental contributions to the theory of elliptic boundary value problems
workplace University of Chicago Department of Mathematics

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