
The mathematical heritage of Hermann Weyl (Durham, NC, 1987)
Surfaces in conformal geometry
Publication
, Chapter
Bryant, R
1988
A survey paper. However, there are some new results. Building on the results in A duality theorm for Willmore surfaces, I use the Klein correspondance to determine the moduli space of Willmore critical spheres for low critical values and also determine the moduli space of Willmore minima for the real projective plane in 3-space.
Duke Scholars
ISBN
0-8218-1482-6
Publication Date
1988
Volume
48
Start / End Page
227 / 240
Publisher
American Mathematical Society
Citation
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Bryant, R. (1988). Surfaces in conformal geometry. In R. O. Wells (Ed.), The mathematical heritage of Hermann Weyl (Durham, NC, 1987) (Vol. 48, pp. 227–240). Providence, RI: American Mathematical Society.
Bryant, R. “Surfaces in conformal geometry.” In The Mathematical Heritage of Hermann Weyl (Durham, NC, 1987), edited by R. O. Wells, 48:227–40. Providence, RI: American Mathematical Society, 1988.
Bryant R. Surfaces in conformal geometry. In: Wells RO, editor. The mathematical heritage of Hermann Weyl (Durham, NC, 1987). Providence, RI: American Mathematical Society; 1988. p. 227–40.
Bryant, R. “Surfaces in conformal geometry.” The Mathematical Heritage of Hermann Weyl (Durham, NC, 1987), edited by R. O. Wells, vol. 48, American Mathematical Society, 1988, pp. 227–40.
Bryant R. Surfaces in conformal geometry. In: Wells RO, editor. The mathematical heritage of Hermann Weyl (Durham, NC, 1987). Providence, RI: American Mathematical Society; 1988. p. 227–240.

ISBN
0-8218-1482-6
Publication Date
1988
Volume
48
Start / End Page
227 / 240
Publisher
American Mathematical Society