Complex curves in hypercomplex nilmanifolds with H-solvable Lie algebras

Abstract

An operator I on a real Lie algebra A is called a complex structure operator if I2=-Id and the -1-eigenspace A1,0 is a Lie subalgebra in the complexification of A. A hypercomplex structure on a Lie algebra A is a triple of complex structures I,J and K on A satisfying the quaternionic relations. We call a hypercomplex nilpotent Lie algebra quaternionic-solvable if there exists a finite filtration by quaternionic-invariant subalgebras with commutative subquotients which converges to zero. We give examples of quaternionic-solvable hypercomplex structures on a nilpotent Lie algebra and conjecture that all hypercomplex structures on nilpotent Lie algebras are quaternionic-solvable. Let (N,I,J,K) be a compact hypercomplex nilmanifold associated to an quaternionic-solvable hypercomplex Lie algebra. We prove that, for a general complex structure L induced by quaternions, there are no complex curves in a complex manifold (N,L).

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