Extremal configurations of polygonal linkages

G. Khimshiashvili; G. Panina; D. Siersma; A. Zhukova

Extremal configurations of polygonal linkages

G. Khimshiashvili
, G. Panina
, D. Siersma
, A. Zhukova

extern

Research output: Book/Report › Report › Professional

Abstract

It is known that a closed polygon P is a critical point of the oriented area function if and only if P is a cyclic polygon, that is, P can be inscribed in a circle. Moreover, there is a short formula for the Morse index. Going further in this direction, we extend these results to the case of open polygonal chains, or robot arms. We introduce the notion of the oriented area for an open polygonal chain, prove that critical points are exactly the cyclic configurations with antipodal endpoints and derive a formula for the Morse index of a critical configuration

Original language	English
Place of Publication	Oberwolfach-Walke
Publisher	OWP
Number of pages	26
Volume	2011-24
Edition	Oberwolfach preprints
Publication status	Published - 2011

Keywords

Wiskunde en Informatica (WIIN)
Mathematics
Landbouwwetenschappen
Natuurwetenschappen
Wiskunde: algemeen

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OWP2011 24
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title = "Extremal configurations of polygonal linkages",

abstract = "It is known that a closed polygon P is a critical point of the oriented area function if and only if P is a cyclic polygon, that is, P can be inscribed in a circle. Moreover, there is a short formula for the Morse index. Going further in this direction, we extend these results to the case of open polygonal chains, or robot arms. We introduce the notion of the oriented area for an open polygonal chain, prove that critical points are exactly the cyclic configurations with antipodal endpoints and derive a formula for the Morse index of a critical configuration",

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AU - Panina, G.

AU - Siersma, D.

AU - Zhukova, A.

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N2 - It is known that a closed polygon P is a critical point of the oriented area function if and only if P is a cyclic polygon, that is, P can be inscribed in a circle. Moreover, there is a short formula for the Morse index. Going further in this direction, we extend these results to the case of open polygonal chains, or robot arms. We introduce the notion of the oriented area for an open polygonal chain, prove that critical points are exactly the cyclic configurations with antipodal endpoints and derive a formula for the Morse index of a critical configuration

AB - It is known that a closed polygon P is a critical point of the oriented area function if and only if P is a cyclic polygon, that is, P can be inscribed in a circle. Moreover, there is a short formula for the Morse index. Going further in this direction, we extend these results to the case of open polygonal chains, or robot arms. We introduce the notion of the oriented area for an open polygonal chain, prove that critical points are exactly the cyclic configurations with antipodal endpoints and derive a formula for the Morse index of a critical configuration

KW - Wiskunde en Informatica (WIIN)

KW - Mathematics

KW - Landbouwwetenschappen

KW - Natuurwetenschappen

KW - Wiskunde: algemeen

M3 - Report

VL - 2011-24

BT - Extremal configurations of polygonal linkages

PB - OWP

CY - Oberwolfach-Walke

ER -

Extremal configurations of polygonal linkages

Abstract

Keywords

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