Triple Points of Immersed Orientable 2n-Manifolds in 3n-Space

The paper proves that for all integer n larger than 3, there exists a self transverse immersion of a 4n dimensional manifold with complex structure on its normal bundle into 6n dimensional Euclidean space that has an odd number of triple points. The paper is not identical to the one that appeared in the LMS journal. That version was sadly corrupted by substandard type setting.