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Main Authors: De, Dibyendu, Pal, Sujan
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.16199
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author De, Dibyendu
Pal, Sujan
author_facet De, Dibyendu
Pal, Sujan
contents Hindman's theorem and van der Waerden's theorem are two classical Ramsey theoretic results, the first one deals with finite configurations and the second one deals with infinite configurations. The Central Sets Theorem due to Furstenberg is a strong simultaneous extension of both theorems, which also applies to general commutative semigroups. Beiglboeck provided a common extension of the Central Sets Theorem and Milliken-Taylor Theorem in commutative case. Furstenberg's original Central Sets Theorem was proved in \cite{key-2} for $\left(\mathbb{N},+\right)$ for finitely many sequences at a time. Bergelson and Hindman provided a non commutative version of this Theorem \cite{key-3}. The first author of this article jointly with Hindman and Straus provided a non-commutative version of Central Sets Theorem using arbitrary many sequence at a time \cite{key-5}. In this work we will provide a non-commutative extension of Beiglboeck's Theorem. We also provide polynomial generalization of Beiglbock's theorem.
format Preprint
id arxiv_https___arxiv_org_abs_2407_16199
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Non commutative multidimensional stronger Central Sets Theorem
De, Dibyendu
Pal, Sujan
Combinatorics
Hindman's theorem and van der Waerden's theorem are two classical Ramsey theoretic results, the first one deals with finite configurations and the second one deals with infinite configurations. The Central Sets Theorem due to Furstenberg is a strong simultaneous extension of both theorems, which also applies to general commutative semigroups. Beiglboeck provided a common extension of the Central Sets Theorem and Milliken-Taylor Theorem in commutative case. Furstenberg's original Central Sets Theorem was proved in \cite{key-2} for $\left(\mathbb{N},+\right)$ for finitely many sequences at a time. Bergelson and Hindman provided a non commutative version of this Theorem \cite{key-3}. The first author of this article jointly with Hindman and Straus provided a non-commutative version of Central Sets Theorem using arbitrary many sequence at a time \cite{key-5}. In this work we will provide a non-commutative extension of Beiglboeck's Theorem. We also provide polynomial generalization of Beiglbock's theorem.
title Non commutative multidimensional stronger Central Sets Theorem
topic Combinatorics
url https://arxiv.org/abs/2407.16199