Bibliography
W. Barthel, R. Volkmer, I. Haubitz, “Thomsensche Minimalflächen — analytisch und anschaulich”, Resultate Math., 3 (1980), 129–154.
L. McNertney Berard, “One parameter families of surfaces with constant curvature in Lorentz 3-space,” Ph.D. thesis, Brown University, 1980.
W. Blaschke, Differentialgeometrie. Band II, Springer Verlag, Berlin, 1923.
F. Dillen, L. Vrancken, “Affine differential geometry of hypersurfaces”, Geometry and Topology of Submanifolds II, World Sci. (1990), 144–164.
L. K. Graves, “Codimension one isometric immersions between Lorentz spaces,” Transactions AMS, 252 (1979), 367–392.
M. A. Magid, “The Bernstein problem for timelike surfaces,” Yokohama Math. J., 37 (1989), 125–137.
M. A. Magid, “Timelike surfaces in Lorentz 3-space with prescribed mean curvature and Gauss map”, to appear in Hokkaido M. J.
F. Manhart, “Die Affinminimalrückingsflächen”, Arch. Math., 44 (1985), 547–556.
T. K. Milnor, “Harmonic maps and classical surface theory in Minkowski 3-space,” Transactions AMS, 280 (1983), 161–185.
T. K. Milnor, “A conformai analog of Bernstein’s theorem for timelike surfaces in Minkowski 3-space,” Contemp. Math., 64(1987), 123–132.
T. K. Milnor, “Entire timelike minimal surfaces in E3,1,” Mich. M. J., 37 (1990), 163–177.
G. Thomsen, Über Affinminimalflächen die gleichzeitig Minimalflächen sind”, Abh. Math. Sem. Hamburg 2 (1923), 69–71.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Magid, M.A. Timelike Thomsen Surfaces. Results. Math. 20, 691–697 (1991). https://doi.org/10.1007/BF03323205
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1007/BF03323205