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Some elementary correspondence in group theory (with applications to algebra/geometry)

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I will discuss an elementary correspondence in group theory that has been used extensively to construct pairs of distinct algebraic/geometric/topological objects that are remarkably similar. I will review some of the work on this topic and will end with some more contemporary applications arising from refinements of this construction.

This talk is part of the Geometric Group Theory (GGT) Seminar series.

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