On Sets of n Points in General Position That Determine Lines That Can Be Pierced by n Points

Chaya Keller; Rom Pinchasi

doi:10.1007/s00454-020-00201-3

On Sets of n Points in General Position That Determine Lines That Can Be Pierced by n Points

Chaya Keller
, Rom Pinchasi

פרסום מחקרי: פרסום בכתב עת › מאמר › ביקורת עמיתים

2 ציטוטים ‏(Scopus)

תקציר

Let P be a set of n points in general position in the plane. Let R be a set of n points disjoint from P such that for every x, y∈ P the line through x and y contains a point in R outside of the segment delimited by x and y. We show that P∪ R must be contained in cubic curve. This resolves a special case of a conjecture of Milićević. We use the same approach to solve a special case of a problem of Karasev related to a bipartite version of the above problem.

שפה מקורית	אנגלית
עמודים (מ-עד)	905-915
מספר עמודים	11
כתב עת	Discrete and Computational Geometry
כרך	64
מספר גיליון	3
מזהי עצם דיגיטלי (DOIs)	https://doi.org/10.1007/s00454-020-00201-3
סטטוס פרסום	פורסם - 1 אוק׳ 2020
פורסם באופן חיצוני	כן

גישה למסמך

10.1007/s00454-020-00201-3

קבצים וקישורים אחרים

Link to publication in Scopus

פורמט ציטוט ביבליוגרפי

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title = "On Sets of n Points in General Position That Determine Lines That Can Be Pierced by n Points",

abstract = "Let P be a set of n points in general position in the plane. Let R be a set of n points disjoint from P such that for every x, y∈ P the line through x and y contains a point in R outside of the segment delimited by x and y. We show that P∪ R must be contained in cubic curve. This resolves a special case of a conjecture of Mili{\'c}evi{\'c}. We use the same approach to solve a special case of a problem of Karasev related to a bipartite version of the above problem.",

keywords = "Cubic curves, Elliptic curves, Line blocker, Lines, Points",

author = "Chaya Keller and Rom Pinchasi",

note = "Publisher Copyright: {\textcopyright} 2020, Springer Science+Business Media, LLC, part of Springer Nature.",

year = "2020",

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doi = "10.1007/s00454-020-00201-3",

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T1 - On Sets of n Points in General Position That Determine Lines That Can Be Pierced by n Points

AU - Keller, Chaya

AU - Pinchasi, Rom

PY - 2020/10/1

Y1 - 2020/10/1

N2 - Let P be a set of n points in general position in the plane. Let R be a set of n points disjoint from P such that for every x, y∈ P the line through x and y contains a point in R outside of the segment delimited by x and y. We show that P∪ R must be contained in cubic curve. This resolves a special case of a conjecture of Milićević. We use the same approach to solve a special case of a problem of Karasev related to a bipartite version of the above problem.

AB - Let P be a set of n points in general position in the plane. Let R be a set of n points disjoint from P such that for every x, y∈ P the line through x and y contains a point in R outside of the segment delimited by x and y. We show that P∪ R must be contained in cubic curve. This resolves a special case of a conjecture of Milićević. We use the same approach to solve a special case of a problem of Karasev related to a bipartite version of the above problem.

KW - Cubic curves

KW - Elliptic curves

KW - Line blocker

KW - Lines

KW - Points

UR - https://www.scopus.com/pages/publications/85084137037

U2 - 10.1007/s00454-020-00201-3

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AN - SCOPUS:85084137037

SN - 0179-5376

VL - 64

SP - 905

EP - 915

JO - Discrete and Computational Geometry

JF - Discrete and Computational Geometry

IS - 3

ER -

On Sets of n Points in General Position That Determine Lines That Can Be Pierced by n Points

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