Michael Sadowsky | |
---|---|
Born | 1902 |
Died | December 31, 1967 65) | (aged
Scientific career | |
Fields | elasticity materials science |
Institutions | Illinois Institute of Technology Rensselaer Polytechnic Institute |
Doctoral advisor | Georg Hamel |
Doctoral students | Eli Sternberg |
Michael A. Sadowsky (1902 – December 31, 1967)[1] was a researcher in solid mechanics, particularly the mathematical theory of elasticity and materials science. Born in the Russian Empire, he earned his doctorate in 1927 under the applied mathematician Georg Hamel at the Technical University of Berlin with a dissertation entitled Spatially periodic solutions in the theory of elasticity (in German).[2] He made contributions in the use of potential functions in elasticity and force transfer mechanisms in composites. Many of his early papers were written in German.[3]
Selected publications
- Sadowsky, Michael (April 1939). "Tetrahedral Riemann Surface Model of a Closed Finite Locally-Euclidean Two-Space". The American Mathematical Monthly. 46 (4): 199–202. doi:10.2307/2303065. JSTOR 2303065.
- Sadowsky, Michael (October 1940). "Formula for Approximate Computation of a Triple Integral". The American Mathematical Monthly. 47 (8): 539–543. doi:10.2307/2303834. JSTOR 2303834.
- "Equiareal Patterns The American Mathematical Monthly". The American Mathematical Monthly. 50 (1): 35–40. January 1943. doi:10.2307/2303990. JSTOR 2303990.
- with E. Sternberg: Sadowsky, M. A.; Sternberg, E. (1950). "Elliptic integral representation of axially symmetric flows". Quart. Appl. Math. 8 (2): 113–126. doi:10.1090/qam/37425. MR 0037425.
References
- ↑ "Obituaries". Mechanical Engineering. American Society of Mechanical Engineers. 90: 113. 1968. Retrieved March 23, 2018.
- ↑ Schmiedeshoff FW (1968) In Memory of Dr Michael A Sadowsky, Journal of Composite Materials 2, 126. doi:10.1177/002199836800200201
- ↑ Hinz DF and Fried E (2014) Translation of Michael Sadowsky’s Paper "An Elementary Proof for the Existence of a Developable Möbius Band and the Attribution of the Geometric Problem to a Variational Problem", Journal of Elasticity doi:10.1007/s10659-014-9490-5.
External links
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