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{E}tale difference algebraic groups
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Paper
{E}tale difference algebraic groups
2021
Overview
\\'{E}tale difference algebraic groups are a difference analog of \\'{e}tale algebraic groups. Our main result is a Jordan-H\"{o}lder type decomposition theorem for these groups. Roughly speaking, it shows that any \\'{e}tale difference algebraic group can be build up from simple \\'{e}tale algebraic groups and two finite \\'{e}tale difference algebraic groups. The simple \\'{e}tale algebraic groups occurring in this decomposition satisfy a certain uniqueness property.
Publisher
Cornell University Library, arXiv.org
Subject
