Flat manifolds with homogeneous holonomy representation

Published 19 Mar 2018 in math.GR and math.RT | (1803.07177v3)

Abstract: We show that a rational holonomy representation of any flat manifold except torus must have at least two non-equivalent irreducible subrepresentations. As an application we show that if a K\"ahler flat manifold is not a torus then its holonomy representation is reducible.

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Authors (1)

Rafał Lutowski

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