Yu. I. Petunin; В. V. Rublev

Minimum-Area ellipse containing a finite set of points. II

Yu. I. Petunin
В. V. Rublev

Abstract

We continue the investigation of the problem of construction of a minimum-area ellipse for a given convex polygon (this problem is solved for a rectangle and a trapezoid). For an arbitrary polygon, we prove that, in the case where the boundary of the minimum-area ellipse has exactly four or five common points with the polygon, this ellipse is the minimum-area ellipse for the quadrangles and pentagons formed by these common points.

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Springer

Published

25.08.1998

How to Cite

Petunin, Y. I., and RublevВ. V. “Minimum-Area Ellipse Containing a Finite Set of Points. II”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 50, no. 8, Aug. 1998, pp. 1098–1105, https://umj.imath.kiev.ua/index.php/umj/article/view/4859.

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Issue

Vol 50 No 8 (1998)

Section

Research articles