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On upward straight-line embeddings of oriented paths

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CAGIRICI Onur CASUSO Leonardo CAROLINA Medina RAGGI Miguel ROLDAN-PENSADO Edgardo SALAZAR Gelasio URRUTIA Jorge

Rok publikování 2017
Druh Článek ve sborníku
Konference EGC 2017, XVII Spanish Meeting on Computational Geometry
Fakulta / Pracoviště MU

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Citace
www The book of abstracts where the publication is available online
Klíčová slova Computational geometry, probability, geometric embedding
Popis We investigate upward straight-line embeddings (UPSEs) of oriented paths. Along the lines of similar results in the literature, we find a condition —related to the number of vertices in between sources and sinks of an oriented path— that guarantees that an oriented path satisfying the condition on n vertices admits an UPSE into any n-point set in general position. We also show that the following holds for every ? > 0. If S is a set of n points chosen uniformly at random in the unit square, and P is an oriented path on at most (1/3 - ?)n vertices, then with high probability P has an UPSE into S.
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