Results 301 to 308 of about 83,771 (308)
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1983
In this paper a more general definition of geodesic in \(\mathbb R^n\) with respect to a given obstacle \(U\), namely on a manifold with boundary, is considered and it is shown that a classical result, obtained by Morse and Serre for a manifold without boundary (see [\textit{J.-P. Serre}, Ann. Math. (2) 54, 425--505 (1951; Zbl 0045.26003)]) holds here,
MARINO, ANTONIO, SCOLOZZI D.
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In this paper a more general definition of geodesic in \(\mathbb R^n\) with respect to a given obstacle \(U\), namely on a manifold with boundary, is considered and it is shown that a classical result, obtained by Morse and Serre for a manifold without boundary (see [\textit{J.-P. Serre}, Ann. Math. (2) 54, 425--505 (1951; Zbl 0045.26003)]) holds here,
MARINO, ANTONIO, SCOLOZZI D.
openaire +2 more sources
Geodesics and geodesic circles in a geodesically convex surface: a sub-mixing property
Publicationes Mathematicae Debrecen, 2019Toshiki Kondo, Nobuhiro Innami
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On the Geodesics and Geodesic Circles on a Developable Surface
The Annals of Mathematics, 1917openaire +2 more sources