Erich Rothe

Not to be confused with Heinrich August Rothe.

Erich Hans Rothe (July 21, 1895, Berlin – February 19, 1988, Ann Arbor, Michigan) was a German-born American mathematician, who did research in mathematical analysis, differential equations, integral equations, and mathematical physics.^[1][2] He is known for the Rothe method (also known as the method of lines or the method of semidiscretization) used for solving evolution equations.^[3][4]

Biography

Rothe, whose father was a lawyer, attended Berlin's Königliches Wilhelms-Gymnasium and passed his Abitur in October 1913. After completing two semesters at the University of Munich, he volunteered to join the German Army in a field artillery regiment. He was wounded in the Battle of Verdun and was discharged from the German Army in December 1918. In 1919 he continued his mathematical studies for one semester at the Technical University of Berlin (TU Berlin) and then transferred to Berlin's Friedrich-Wilhelms-Universität (Friedrich Wilhelm University, now called the Humboldt University of Berlin). There he studied mathematics, physics, and philosophy and in 1923 passed the Lehramtsexamen qualifying him to become a Gymnasium teacher. From 1923 to 1926 he taught at Berlin's Mommsen-Gymnasium.^[1] In 1927 he received his Promotion from TU Berlin. His dissertation Über einige Analogien zwischen linearen partiellen und linearen gewöhnlichen Differentialgleichungen (About some analogies between linear partial and linear ordinary differential equations) was supervised by Erhard Schmidt and Richard von Mises.^[5] Rothe worked from 1926 to 1927 at the Institute of Applied Mathematics of the Friedrich Wilhelm University. In 1928 he married the mathematician Hildegard Ille (1899–1942).^[1] From 1928 to 1931 he was a Privatdozent and Assistent under Fritz Noether at the Technische Hochschule Breslau. There he received his Habilitation in 1928. From 1931 to 1935 he was a Privatdozent at the University of Breslau. There he received his Umhabilitation in 1931).^[6][7] During the time he held positions in Breslau, he took study leave for a year at the University of Göttingen. In Breslau in April 1931 Hildegard Rothe gave birth to Erhard W. Rothe.^[1]

After being dismissed in 1935 from the German civil service because he was a Jew, Rothe with his wife and son escaped to Zurich and in emigrated in 1937 to the USA. From 1937 to 1943 he taught mathematics (with a very small salary) at William Penn College (now William Penn University) in Oskaloosa, Iowa.^[1][8] His wife died of cancer in December 1942. At the University of Michigan, Rothe was an assistant professor from 1944 to 1949, an associate professor from 1949 to 1955, and a full professor from 1955 to 1964, when he retired as professor emeritus.^[1] In retirement, he taught at the University of Michigan–Dearborn^[9] and in the academic year 1967–1968 at Western Michigan University (WMU).^[1] During his year at WMU, Rothe helped to develop the PhD program for WMU's mathematics department, which awarded its first PhD in December 1969.^[10]

Rothe published more than 50 mathematical papers.^[9] He was a co-author, with Hans Rademacher, of chapter 19 of the 7th edition of Die Differential- und Integralgleichungen der Mechanik und Physik.^[11] In 1986 at the age of 91, Rothe published the 242-page book Introduction to Various Aspects of Degree Theory in Banach Spaces.^[1]

His contributions to mathematical research reflect his great breadth: differential and integral equations, linear and nonlinear functional analysis, topology, calculus of variations.^[12]

In addition to the Rothe Method, he is also known for his theorem, proven in 1937, that a functional in a Hilbert space is weakly continuous if and only if its Fréchet derivative is a completely continuous operator^{[13][14][15][16]} and for Rothe's fixed point theorem, proven in 1937.^[17][18] In 1978 a collection of papers was published in his honor.^[19] His doctoral students include Jane Cronin Scanlon and George J. Minty.^[12]

Upon his death, Erich Rothe was survived by his son and two granddaughters.^[9]

Selected publications

• Rothe, E. H. (1946). "Gradient Mappings in Hilbert Space". Annals of Mathematics. 47 (3): 580–592. doi:10.2307/1969094. JSTOR 1969094.
• —— (1948). "Completely Continuous Scalars and Variational Methods". Annals of Mathematics. 49 (2): 265–278. doi:10.2307/1969277. JSTOR 1969277.
• —— (1948). "Gradient mappings and extrema in Banach spaces". Duke Mathematical Journal. 15 (2): 421–431. doi:10.1215/S0012-7094-48-01540-3. ISSN 0012-7094.
• —— (1949). "Weak Topology and Nonlinear Integral Equations". Transactions of the American Mathematical Society. 66 (1): 75–92. doi:10.2307/1990549. JSTOR 1990549.
• —— (1950). "A relation between the type numbers of a critical point and the index of the corresponding field of gradient vectors. Erhard Schmidt zum 75. Geburtstag gewidmet". Mathematische Nachrichten. 4 (1–6): 12–27. doi:10.1002/mana.3210040103.
• —— (1951). "Critical points and gradient fields of scalars in Hilbert space". Acta Mathematica. 85: 73–98. doi:10.1007/BF02395742.
• —— (1952). "Leray-Schauder Index and Morse Type Numbers in Hilbert Space". Annals of Mathematics. 55 (3): 433–467. doi:10.2307/1969643. JSTOR 1969643.
• —— (1952). "A Remark on Isolated Critical Points". American Journal of Mathematics. 74 (1): 253–263. doi:10.2307/2372083. JSTOR 2372083.
• —— (1953). "A note on the Banach spaces of Calkin and Morrey" (PDF). Pacific J. Math. 3 (2): 493–499. doi:10.2140/pjm.1953.3.493.
• —— (1953). "Gradient mappings". Bulletin of the American Mathematical Society. 59: 5–20. doi:10.1090/S0002-9904-1953-09649-5.
• —— (1956). "Remarks on the application of gradient mappings to the calculus of variations and the connected boundary value problems in partial differential equations". Communications on Pure and Applied Mathematics. 9 (3): 551–568. doi:10.1002/cpa.3160090325.
• —— (1959). "A Note on Gradient Mappings". Proceedings of the American Mathematical Society. 10 (6): 931–935. doi:10.2307/2033624. JSTOR 2033624.
• —— (1965). "Critical point theory in Hilbert space under general boundary conditions" (PDF). Journal of Mathematical Analysis and Applications. 11: 357–409. doi:10.1016/0022-247X(65)90092-2. hdl:2027.42/32071.
• —— (1966). "An existence theorem in the calculus of variations based on Sobolev's imbedding theorems". Arch. Rational Mech. Analysis. 21 (2): 151–162. doi:10.1007/BF00266572. hdl:2027.42/46175. S2CID 30858816.
• —— (1971). "Critical point theory in Hilbert space under regular boundary conditions" (PDF). Journal of Mathematical Analysis and Applications. 36 (2): 377–431. doi:10.1016/0022-247X(71)90010-2.
• —— (1973). "Morse Theory in Hilbert Space". The Rocky Mountain Journal of Mathematics. 3 (2): 251–274. doi:10.1216/RMJ-1973-3-2-251. JSTOR 44236313.
• —— (1975). "A generalization of the Seifert-Threlfall proof for the Lusternik-Schnirelman category inequality" (PDF). Journal of Mathematical Analysis and Applications. 50 (2): 243–267. doi:10.1016/0022-247X(75)90020-7.
• Introduction to Various Aspects of Degree Theory in Banach Spaces. Mathematical Surveys and Monographs. Vol. 23. Providence, Rhode Island: American Mathematical Society. 1986. ISBN 9780821827703.^[20]

References

1. O'Connor, John J.; Robertson, Edmund F., "Erich Hans Rothe", MacTutor History of Mathematics Archive, University of St Andrews
2. Displaced German Scholars: A Guide to Academics in Peril in Nazi Germany During the 1930s. Wildside Press LLC. 1 January 1993. p. 53. ISBN 978-0-89370-474-2.
3. Rothe, Erich (1930). "Zweidimensionale parabolische Randwertaufgaben als Grenzfall eindimensionaler Randwertaufgaben". Mathematische Annalen. 102 (1): 650–670. doi:10.1007/BF01782368. ISSN 0025-5831. S2CID 123325520.
4. "Method of Rothe in evolution equations by J. Kačur". Equadiff 6: Proceedings of the International Conference on Differential Equations and their Applications, held in Brno, Czechoslovakia August 21–30, 1985. Vol. 1192. 1986. pp. 23–34. doi:10.1007/BFb0076049. hdl:10338.dmlcz/700142. ISSN 0075-8434.
5. Erich Hans Rothe at the Mathematics Genealogy Project
6. Scharlau, Winfried, ed. (1990). Mathematische Institute in Deutschland, 1800–1945. Vieweg. pp. 64 & 70. doi:10.1007/978-3-663-14036-8. ISBN 978-3-528-08992-4.
7. The term Umhabilitation refers to the academic procedure in which professors or Privatdozenten acquire the license to teach (venia legendi) at another university by means of a shortened procedure.
8. Siegmund-Schultze, Reinhard (2009). Mathematicians Fleeing from Nazi Germany: Individual Fates and Global Impact. Princeton University Press. p. 194. ISBN 978-0-691-12593-0.
9. "Erich Hans Rothe". Faculty History Project, University of Michigan.
10. "A Brief History of Mathematics at WMU" (PDF). Mathematical Association of America Michigan Section Newsletter. 30 (1): 16. December 2003.
11. von Mises, Richard; Frank, Philipp, eds. (1925). Die Differential- und Integralgleichungen der Mechanik und Physik: als 7. Auflage von Riemann-Webers Partiellen Differentialgleichungen der mathematischen Physik. F. Vieweg.
12. Kaplan, Wilfred (1965). "A tribute to Erich H. Rothe" (PDF). Journal of Mathematical Analysis and Applications. 12 (3): 381–382. doi:10.1016/0022-247X(65)90002-8.
13. Cesari, Lamberto (1965). "Introductory remarks to a lecture of Erich H. Rothe" (PDF). Journal of Mathematical Analysis and Applications. 12 (3): 382–383. doi:10.1016/0022-247X(65)90003-X.
14. Maximilian Pinl: Kollegen in einer dunklen Zeit, Jahresbericht der DMV 71, 208/209, 1969
15. Rothe, E. H. (1937). "Über Abbildungsklassen von Kugeln des Hilbertschen Raumes". Compositio Math. 4: 294–307.
16. Rothe, E. H. (1937). "Über den Abbildungsgrad bei Abbildungen von Kugeln des Hilbertschen Raumes". Compositio Math. 5: 166–176.
17. Smart, D. R. (14 February 1980). Fixed Point Theorems. CUP Archive. pp. 26–27. ISBN 978-0-521-29833-9.
18. Rothe, E. H. (1937). "Zur Theorie der topologischen Ordnung und der Vektorfelder in Benachschen Raumen". Compositio Math. 5: 177–197.
19. Cesari, L.; Kannan, R.; Weinberger, H. F., eds. (1978). Nonlinear Analysis: A Collection of Papers in Honor of Erich H. Rothe. Academic Press. ISBN 978-0-12-165550-1. (This book contains a list of Rothe's publications.)
20. Deimling, Klaus (October 1987). "Review of Introduction to various aspects of degree theory in Banach spaces by E. H. Rothe". Bull. Amer. Math. Soc. (N.S.). 17 (2): 340–343. doi:10.1090/S0273-0979-1987-15585-6.

External links

• "Faculty Bibliography of Erich H. Rothe". Journal of Mathematical Analysis and Applications. 12 (3): 384–386. 1965. doi:10.1016/0022-247X(65)90004-1.