Struwe, Michael, 1955-....
Struwe, Michael
Michael Struwe
VIAF ID: 71465833 ( Personal )
Permalink: http://viaf.org/viaf/71465833
Preferred Forms
- 100 0 _ ‡a Michael Struwe
- 200 _ | ‡a Struwe ‡b Michael ‡f 1955-....
- 100 1 _ ‡a Struwe, Michael
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- 100 1 _ ‡a Struwe, Michael ‡d 1955-
- 100 1 _ ‡a Struwe, Michael ‡d 1955-
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- 100 1 0 ‡a Struwe, Michael, ‡d 1955-
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- 100 1 _ ‡a Struwe, Michael, ‡d 1955-....
4xx's: Alternate Name Forms (18)
5xx's: Related Names (3)
- 510 2 _ ‡a Eidgenössische Technische Hochschule Zürich ‡4 affi ‡4 https://d-nb.info/standards/elementset/gnd#affiliation ‡e Affiliation
- 510 2 _ ‡a Rheinische Friedrich-Wilhelms-Universität Bonn ‡4 affi ‡4 https://d-nb.info/standards/elementset/gnd#affiliation ‡e Affiliation
- 551 _ _ ‡a Wuppertal ‡4 ortg ‡4 https://d-nb.info/standards/elementset/gnd#placeOfBirth
Works
Title | Sources |
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Analysis of singularities in elliptic equations : the Ginzburg-Landau model of superconductivity, the Lin-Ni-Takagi problem, the Keller-Segel model of chemotaxis, and conformal geometry | |
counterexample in regularity theory for parabolic systems | |
existence of surfaces of constant mean curvature with free boundaries | |
Generalized Palais-Smale conditions and applications | |
Geometric wave equations | |
Harmonic maps on planar lattices | |
Large H-surfaces via the mountain-pass-lemma | |
Morse-Conley theory for minimal surfaces of varying topological type | |
Multiple solutions of differential equations without the Palais-Smale condition | |
new proof of Yamabe's theorem | |
note on the problem -Δu= λu + u|u|23623462 [uuuu] | |
On a critical point theory for minimal surfaces spanning a wire in Rn | |
On a free boundary problem for minimal surfaces | |
On the evolution of harmonic mappings of Riemannian surfaces | |
On the Hölder continuity of bounded weak solutions of quasi-linear parabolic inequalities | |
Plateau's problem and the calculus of variations | |
Quasilinear elliptic eigenvalue problems | |
Spatially discrete wave maps on (1+2)-dimensional space time | |
Variational methods applications to nonlinear partial differential equations and Hamiltonian systems | |
Variational methods, c1990:CIP t.p. (Michael Struwe) t.p. verso (prof., mathematik, ETH-Zentrum, Zürich) data sheet (b. 10/6/55) | |
Zurich lectures in advanced mathematics |