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Abstract Answering a question posed by Bergelson and Leibman in [6] , we establish a nilpotent version of the Polynomial Hales–Jewett Theorem that contains the main theorem in [6] as… Click to show full abstract
Abstract Answering a question posed by Bergelson and Leibman in [6] , we establish a nilpotent version of the Polynomial Hales–Jewett Theorem that contains the main theorem in [6] as a special case. Important to the formulation and the proof of our main theorem is the notion of a relative syndetic set (relative with respect to a closed non-empty subsets of β G ) [25] . As a corollary of our main theorem we prove an extension of the restricted van der Waerden Theorem to nilpotent groups, which involves nilprogressions.
Keywords:
main theorem;
hales jewett;
polynomial hales;
revisiting nilpotent;
jewett theorem
Journal Title: Advances in Mathematics
Year Published: 2017
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Journal Title: Advances in Mathematics
Year Published: 2017
Link to full text (if available)
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recommendations!