The existence of Zariski dense orbits for endomorphisms of projective surfaces (with an appendix in collaboration with Thomas Tucker)

The Dynamical Mordell-Lang Conjecture for skew-linear self-maps

Ghioca, Dragos
Xie, Junyi
Wibmer, with an appendix written by Michael

January 2018

International audienceLet k be an algebraically closed field of characteristic 0, let X=P^1\times A^...

On Potential Density of rational Points on Abelian Varieties

Herivelto Borges
Marcos Zarzar

January 2006

One says that an algebraic variety V defined over a field K has po-tential density of rational point...

Dynamics on abelian varieties in positive characteristic

Byszewski, Jakub
Cornelissen, G.L.M.
Royals, Robert
Ward, Thomas

December 2018

We study periodic points and orbit length distribution for endomorphisms of abelian varieties in cha...

The existence of Zariski dense orbits for endomorphisms of projective surfaces (with an appendix in collaboration with Thomas Tucker)

Xie, Junyi

November 2019

65 pages. We generalized the results in the first version and add an appendix in collaboration with ...

On the Zariski dense orbit conjecture

Xie, Junyi

May 2021

We prove the following theorem. Let f be a dominant endomorphism of a projective surface over an alg...

The existence of Zariski dense orbits for polynomial endomorphisms of the affine plane

Xie, Junyi

January 2017

arXiv admin note: substantial text overlap with arXiv:1503.00773International audienceIn this paper ...

Zariski dense orbits for regular self-maps of tori in positive characteristic

Saleh, Sina

May 2022

We formulate a variant in characteristic p of the Zariski dense orbit conjecture previously posed by...

Zariski orbit dense conjecture on birational automorphisms of projective threefolds

Li, Sichen

August 2022

Under the framework of dynamics on projective varieties by Kawamata, Nakayama and Zhang \cite{Kawama...

A couple of conjectures in arithmetic dynamics over fields of positive characteristic.

Ghioca, Dragos

May 2021

The Dynamical Mordell-Lang Conjecture predicts the structure of the intersection between a subvariet...

Dynamically improper hypersurfaces for endomorphisms of projective space

Olechnowicz, Matt

July 2022

We prove that among nonlinear endomorphisms of the projective plane, those with a periodic critical ...

Verifying Zariski density of rational points on del Pezzo surfaces of degree 1

van Luijk, Ronald

March 2019

Let $S$ be a del Pezzo surface of degree $1$ over a number field $k$. The main goal of this talk is ...

Algebraic dynamics of skew-linear self-maps

Ghioca, Dragos
Xie, Junyi

March 2018

To appear in Proceedings of the AMSLet $X$ be a variety defined over an algebraically closed field $...

Dynamique algébrique des applications rationnelles de surfaces

Xie, Junyi

July 2014

This thesis contains three parts. The first one is devoted to the study of the set of periodic point...

AUTOMATIC UNIFORMITY

Thomas Scanlon

February 2008

Abstract. Let X be an algebraic variety over the algebraically closed field K and Ξ ⊆ X(K) a set of ...

Periodic points of birational maps on projective surfaces

Xie, Junyi

March 2012

30 pagesWe classify birational maps of projective smooth surfaces whose non-critical periodic points...

The Dynamical Mordell-Lang Conjecture for skew-linear self-maps

Ghioca, Dragos
Xie, Junyi
Wibmer, with an appendix written by Michael

January 2018

International audienceLet k be an algebraically closed field of characteristic 0, let X=P^1\times A^...

On Potential Density of rational Points on Abelian Varieties

Herivelto Borges
Marcos Zarzar

January 2006

One says that an algebraic variety V defined over a field K has po-tential density of rational point...

Dynamics on abelian varieties in positive characteristic

Byszewski, Jakub
Cornelissen, G.L.M.
Royals, Robert
Ward, Thomas

December 2018

We study periodic points and orbit length distribution for endomorphisms of abelian varieties in cha...

The existence of Zariski dense orbits for endomorphisms of projective surfaces (with an appendix in collaboration with Thomas Tucker)

Xie, Junyi

November 2019

65 pages. We generalized the results in the first version and add an appendix in collaboration with ...

On the Zariski dense orbit conjecture

Xie, Junyi

May 2021

We prove the following theorem. Let f be a dominant endomorphism of a projective surface over an alg...

The existence of Zariski dense orbits for polynomial endomorphisms of the affine plane

Xie, Junyi

January 2017

arXiv admin note: substantial text overlap with arXiv:1503.00773International audienceIn this paper ...

Zariski dense orbits for regular self-maps of tori in positive characteristic

Saleh, Sina

May 2022

We formulate a variant in characteristic p of the Zariski dense orbit conjecture previously posed by...

Zariski orbit dense conjecture on birational automorphisms of projective threefolds

Li, Sichen

August 2022

Under the framework of dynamics on projective varieties by Kawamata, Nakayama and Zhang \cite{Kawama...

A couple of conjectures in arithmetic dynamics over fields of positive characteristic.

Ghioca, Dragos

May 2021

The Dynamical Mordell-Lang Conjecture predicts the structure of the intersection between a subvariet...

Dynamically improper hypersurfaces for endomorphisms of projective space

Olechnowicz, Matt

July 2022

We prove that among nonlinear endomorphisms of the projective plane, those with a periodic critical ...

Verifying Zariski density of rational points on del Pezzo surfaces of degree 1

van Luijk, Ronald

March 2019

Let $S$ be a del Pezzo surface of degree $1$ over a number field $k$. The main goal of this talk is ...

Algebraic dynamics of skew-linear self-maps

Ghioca, Dragos
Xie, Junyi

March 2018

To appear in Proceedings of the AMSLet $X$ be a variety defined over an algebraically closed field $...

Dynamique algébrique des applications rationnelles de surfaces

Xie, Junyi

July 2014

This thesis contains three parts. The first one is devoted to the study of the set of periodic point...

AUTOMATIC UNIFORMITY

Thomas Scanlon

February 2008

Abstract. Let X be an algebraic variety over the algebraically closed field K and Ξ ⊆ X(K) a set of ...

Periodic points of birational maps on projective surfaces

Xie, Junyi

March 2012

30 pagesWe classify birational maps of projective smooth surfaces whose non-critical periodic points...

The Dynamical Mordell-Lang Conjecture for skew-linear self-maps

Ghioca, Dragos
Xie, Junyi
Wibmer, with an appendix written by Michael

January 2018

International audienceLet k be an algebraically closed field of characteristic 0, let X=P^1\times A^...

On Potential Density of rational Points on Abelian Varieties

Herivelto Borges
Marcos Zarzar

January 2006

One says that an algebraic variety V defined over a field K has po-tential density of rational point...

Dynamics on abelian varieties in positive characteristic

Byszewski, Jakub
Cornelissen, G.L.M.
Royals, Robert
Ward, Thomas

December 2018

We study periodic points and orbit length distribution for endomorphisms of abelian varieties in cha...

The existence of Zariski dense orbits for endomorphisms of projective surfaces (with an appendix in collaboration with Thomas Tucker)

Abstract

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The existence of Zariski dense orbits for endomorphisms of projective surfaces (with an appendix in collaboration with Thomas Tucker)

Abstract

Extracted data

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