TOTAL CURVATURE AND AREA OF CURVES WITH CUSPS AND OF SURFACE MAPS

TOTAL CURVATURE AND AREA OF CURVES WITH CUSPS AND OF SURFACE MAPS

A curvature-area inequality for planar curves with cusps is derived. Using this inequality, the total (Lipschitz-Killing) curvature of a map with stable singularities of a closed surface into the plane is shown to be bounded below by the area of the map divided by the square of the radius of the sma...

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Veröffentlicht in:Mathematica scandinavica 2005-01, Vol.96 (2), p.224-242
Hauptverfasser: EKHOLM, TOBIAS, KUTZSCHEBAUCH, FRANK
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
Curvature
Differential Geometry
Line segments
MATEMATIK
Mathematical cusps
Mathematical inequalities
Mathematical theorems
MATHEMATICS
Surface areas
Tangents
Vertices
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Zusammenfassung:A curvature-area inequality for planar curves with cusps is derived. Using this inequality, the total (Lipschitz-Killing) curvature of a map with stable singularities of a closed surface into the plane is shown to be bounded below by the area of the map divided by the square of the radius of the smallest ball containing the image of the map. This latter result fills the gap in Santaló's [7] proof of a similar estimate for surface maps into Rn, n > 2.
ISSN:0025-5521
1903-1807
1903-1807
DOI:10.7146/math.scand.a-14954