Unstable minimal surfaces in symmetric spaces of non-compact type
Abstract
We prove that if is a closed surface of genus at least 3 and G is a split real semisimple Lie group of rank at least 3 acting faithfully by isometries on a symmetric space N, then there exists a Hitchin representation :π1() G and a -equivariant unstable minimal map from the universal cover of to N. This follows from a new lower bound on the index of high energy minimal maps into an arbitrary symmetric space of non-compact type. Taking G=PSL(n,R), n≥ 4, this disproves the Labourie conjecture.
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