Maxwell Rosenlicht (1924–1999)
Auteur de Introduction to Analysis (Dover Books on Mathematics)
A propos de l'auteur
Œuvres de Maxwell Rosenlicht
Étiqueté
Partage des connaissances
- Nom légal
- Rosenlicht, Maxwell Alexander
- Date de naissance
- 1924-04-15
- Date de décès
- 1999-01-22
- Sexe
- male
- Nationalité
- USA
- Lieu de naissance
- Brooklyn, New York, USA
- Lieu du décès
- Hawaii, USA
- Lieux de résidence
- Brooklyn, New York, USA (birthplace)
Berkeley, California, USA
Tucson, Arizona, USA - Études
- Harvard University (PhD)
Columbia University - Professions
- professor
mathematician - Relations
- Zariski, Oscar (teacher)
- Organisations
- University of California, Berkeley
- Prix et distinctions
- Cole Prize (1960)
Putnam Fellow (1946 and 1947)
Fulbright Fellowship
Guggenheim Fellowship - Courte biographie
- Maxwell Rosenlicht was born in Brooklyn, New York, and attended Erasmus High School. He earned his B.A. at Columbia University in 1947, and then went to Harvard University for his Ph.D. in mathematics, which he earned in 1950. There he studied with the eminent algebraic geometer Oscar Zariski. Rosenlicht was named a Putnam Fellow twice, in 1946 and 1947. In 1952, he joined the mathematics faculty at Northwestern University. From 1958 until his retirement in 1991, he was a professor in the Department of Mathematics at the University of California, Berkeley. He also served as a visiting professor at the University of Rome, the University of Leiden, the Institut des Hautes Etudes Scientifiques in France, the University of Catalunya, the National University of Mexico, and Harvard. Rosenlicht was a Fulbright Fellow and a Guggenheim Fellow in 1954. That same year, he married Carla Zingarelli, with whom he had four children. In 1960, he shared the Frank Nelson Cole Prize in Algebra from the American Mathematical Society with Serge Lang.
Membres
Critiques
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Statistiques
- Œuvres
- 1
- Membres
- 195
- Popularité
- #112,377
- Évaluation
- 3.7
- Critiques
- 1
- ISBN
- 5
The book contains problems to solve but does not contain the solutions to those problems. I don’t think that would be too much of an issue, but you never know in some cases. Perhaps nowadays you can go and search for the solution online.
In any case, this book is short but quite concise. Since it is short, it cut out all of the extraneous junk and we are treated to just the basics. According to the Preface of the book, some items on Differential Forms had to be cut to avoid “exorbitant algebraic detours.” I don’t know exactly what that means, but I’ll go with it.… (plus d'informations)