1989
DOI: 10.1090/memo/0405
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Blaschke’s rolling theorem in 𝑅ⁿ

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Cited by 17 publications
(18 citation statements)
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“…This result is essentially the far-reaching, relatively recent generalization of Blaschke's Rolling Ball Theorem by Strantzen. A reference for it is Lemma 9.11 on p. 83 of [16]. For more details on this, as well as for some new approaches to the proof of this generalization of the classical Blaschke Rolling Ball Theorem, see [43].…”
Section: The Oscillation Of a Polynomial In Maximum Normmentioning
confidence: 99%
“…This result is essentially the far-reaching, relatively recent generalization of Blaschke's Rolling Ball Theorem by Strantzen. A reference for it is Lemma 9.11 on p. 83 of [16]. For more details on this, as well as for some new approaches to the proof of this generalization of the classical Blaschke Rolling Ball Theorem, see [43].…”
Section: The Oscillation Of a Polynomial In Maximum Normmentioning
confidence: 99%
“…18 A letter from Hays to Godwin traced to January 1796 clarifies her position regarding chastity: ''chaste, virtuous, & individual, affection, I believe to be one of the highest, most delicate, & most ineffable, sources of our satisfactions''. 19 Her chastity is, hence, liberating and not confining, as traditionally depicted.…”
Section: Mary Hays's the Victim Of Prejudice 1 : Chastity Renegotiatedmentioning
confidence: 99%
“…It follows directly from the previous corollary, because for convex M we have cc(M) = N. A similar result has been proved by J. Rauch [9], who showed a stronger result if both surfaces have strictly positive curvature: in that case it is not necessary to assume that N is contained in M, it is automatically true (see also [5]). A detailed study of generalizations of Blaschke's rolling theorem in the smooth and non-smooth case can be found in [3].…”
Section: Special Casesmentioning
confidence: 99%