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arxiv: 2102.04651 · v2 · pith:V57NNJV4new · submitted 2021-02-09 · 🧮 math.CO · math.NT

A blurred view of Van der Waerden type theorems

classification 🧮 math.CO math.NT
keywords epsilonarithmeticldotsprogressionresultswaerdenapproximateapproximation
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Let $AP_k=\{a,a+d,\ldots,a+(k-1)d\}$ be an arithmetic progression. For $\epsilon>0$ we call a set $AP_k(\epsilon)=\{x_0,\ldots,x_{k-1}\}$ an $\epsilon$-approximate arithmetic progression if for some $a$ and $d$, $|x_i-(a+id)|<\epsilon d$ holds for all $i\in\{0,1\ldots,k-1\}$. Complementing earlier results of Dumitrescu, in this paper we study numerical aspects of Van der Waerden, Szemeredi and Furstenberg-Katznelson like results in which arithmetic progressions and their higher dimensional extensions are replaced by their $\epsilon$-approximation.

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