Abstract
We prove that the asymptotic completion of a developable Möbius strip in Euclidean three-space must have at least one singular point other than cuspidal edge singularities. Moreover, if the strip is generated by a closed geodesic, then the number of such singular points is at least three. These lower bounds are both sharp.
Citation
Kosuke Naokawa. "Singularities of the asymptotic completion of developable Möbius strips." Osaka J. Math. 50 (2) 425 - 437, June 2013.
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