A generalisation of Sylvester's problem to higher dimensions

A Combinatorial Distinction Between the Euclidean and Projective Planes

Szemerédi, E.
Trotter, W.T.

December 1983

Let n and m be integers with n = m2 + m + 1. Then the projective plane of order m has n points and n...

On a Conjecture of Kelly on $(1,3)$-representation of Sylvester Gallai Designs

Kumar, C P Anil
Singh, Anoop

March 2020

We give an exact criterion of a conjecture of L.M.Kelly to hold true which is stated as follows. If ...

On the number of k-subsets of a set of n points in the plane

Goodman, Jacob E
Pollack, Richard

January 1984

AbstractFor a configuration S of n points in E2, H. Edelsbrunner (personal communication) has asked ...

A generalisation of Sylvester's problem to higher dimensions

Ball, Simeon Michael
Monserrat, Joaquim

In this article we consider $S$ to be a set of points in $d$-space with the property that any $d$ po...

On sets of points with few ordinary hyperplanes

Jiménez Izquierdo, Enrique

July 2018

Let $S$ be a set of $n$ points in the projective $d$-dimensional real space $\mathbb{RP}^d$ such tha...

Generalisation of Sylvester's problem

Monserrat Companys, Joaquim

Let $P$ be a set of $n$ points in the projective space of dimension $d$ with the property that not a...

Generalisation of Sylvester's problem

Monserrat Companys, Joaquim

September 2015

Let $P$ be a set of $n$ points in the projective space of dimension $d$ with the property that not a...

On sets defining few ordinary hyperplanes

Lin, Aaron
Swanepoel, Konrad

April 2020

Let P be a set of n points in real projective d-space, not all contained in a hyperplane, such that ...

On sets of points with few ordinary hyperplanes

Jiménez Izquierdo, Enrique

July 2018

Let $S$ be a set of $n$ points in the projective $d$-dimensional real space $\mathbb{RP}^d$ such tha...

On Higher Dimensional Point Sets in General Position

Suk, Andrew
Zeng, Ji

January 2023

A finite point set in ?^d is in general position if no d + 1 points lie on a common hyperplane. Let ...

General position subsets and independent hyperplanes in d-space

Cardinal, Jean
Tóth, Csaba C.D.
Wood, David

April 2017

Erdős asked what is the maximum number α(n) such that every set of n points in the plane with no fou...

Cells with many facets in arrangements of hyperplanes

Roudneff, Jean-Pierre

December 1991

AbstractFor every n, d, n⩾2d+1⩾5, we prove the existence of an arrangement H of n hyperplanes in the...

Structure theorems and extremal problems in incidence geometry

Lin, Hiu Chung Aaron

November 2019

In this thesis, we prove variants and generalisations of the Sylvester-Gallai theorem, which states ...

Some Problems in Discrete Geometry

Xiaomin Chen

January 2006

The Sylvester-Gallai theorem asserts that any non-collinear point set in the plane de-termines a lin...

Exponentially sized pointsets with angles less than 61 degrees

Marinov, Miroslav

July 2022

We prove that any set of points in $\mathbb{R}^d$, any three of which form an angle less than $\frac...

A Combinatorial Distinction Between the Euclidean and Projective Planes

Szemerédi, E.
Trotter, W.T.

December 1983

Let n and m be integers with n = m2 + m + 1. Then the projective plane of order m has n points and n...

On a Conjecture of Kelly on $(1,3)$-representation of Sylvester Gallai Designs

Kumar, C P Anil
Singh, Anoop

March 2020

We give an exact criterion of a conjecture of L.M.Kelly to hold true which is stated as follows. If ...

On the number of k-subsets of a set of n points in the plane

Goodman, Jacob E
Pollack, Richard

January 1984

AbstractFor a configuration S of n points in E2, H. Edelsbrunner (personal communication) has asked ...

A generalisation of Sylvester's problem to higher dimensions

Ball, Simeon Michael
Monserrat, Joaquim

In this article we consider $S$ to be a set of points in $d$-space with the property that any $d$ po...

On sets of points with few ordinary hyperplanes

Jiménez Izquierdo, Enrique

July 2018

Let $S$ be a set of $n$ points in the projective $d$-dimensional real space $\mathbb{RP}^d$ such tha...

Generalisation of Sylvester's problem

Monserrat Companys, Joaquim

Let $P$ be a set of $n$ points in the projective space of dimension $d$ with the property that not a...

Generalisation of Sylvester's problem

Monserrat Companys, Joaquim

September 2015

Let $P$ be a set of $n$ points in the projective space of dimension $d$ with the property that not a...

On sets defining few ordinary hyperplanes

Lin, Aaron
Swanepoel, Konrad

April 2020

Let P be a set of n points in real projective d-space, not all contained in a hyperplane, such that ...

On sets of points with few ordinary hyperplanes

Jiménez Izquierdo, Enrique

July 2018

Let $S$ be a set of $n$ points in the projective $d$-dimensional real space $\mathbb{RP}^d$ such tha...

On Higher Dimensional Point Sets in General Position

Suk, Andrew
Zeng, Ji

January 2023

A finite point set in ?^d is in general position if no d + 1 points lie on a common hyperplane. Let ...

General position subsets and independent hyperplanes in d-space

Cardinal, Jean
Tóth, Csaba C.D.
Wood, David

April 2017

Erdős asked what is the maximum number α(n) such that every set of n points in the plane with no fou...

Cells with many facets in arrangements of hyperplanes

Roudneff, Jean-Pierre

December 1991

AbstractFor every n, d, n⩾2d+1⩾5, we prove the existence of an arrangement H of n hyperplanes in the...

Structure theorems and extremal problems in incidence geometry

Lin, Hiu Chung Aaron

November 2019

In this thesis, we prove variants and generalisations of the Sylvester-Gallai theorem, which states ...

Some Problems in Discrete Geometry

Xiaomin Chen

January 2006

The Sylvester-Gallai theorem asserts that any non-collinear point set in the plane de-termines a lin...

Exponentially sized pointsets with angles less than 61 degrees

Marinov, Miroslav

July 2022

We prove that any set of points in $\mathbb{R}^d$, any three of which form an angle less than $\frac...

A Combinatorial Distinction Between the Euclidean and Projective Planes

Szemerédi, E.
Trotter, W.T.

December 1983

Let n and m be integers with n = m2 + m + 1. Then the projective plane of order m has n points and n...

On a Conjecture of Kelly on $(1,3)$-representation of Sylvester Gallai Designs

Kumar, C P Anil
Singh, Anoop

March 2020

We give an exact criterion of a conjecture of L.M.Kelly to hold true which is stated as follows. If ...

On the number of k-subsets of a set of n points in the plane

Goodman, Jacob E
Pollack, Richard

January 1984

AbstractFor a configuration S of n points in E2, H. Edelsbrunner (personal communication) has asked ...

A generalisation of Sylvester's problem to higher dimensions

Abstract

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A generalisation of Sylvester's problem to higher dimensions

Abstract

Extracted data

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