Perturbation and Pruning of Nondegenerate Z/2 Harmonic 1-forms
Abstract
We prove that for any nondegenerate Z/2 harmonic 1-form, there exists a metric perturbation producing a new nondegenerate Z/2 harmonic 1-form whose ordinary zero set is discrete. As an application, we show that for generic smooth nondegenerate Z/2 harmonic 1-forms, the leaf spaces are Z-trees. Moreover, we show that if a 3-dimensional rational homology sphere admits a smooth nondegenerate Z/2-harmonic 1-form, then there exists another nondegenerate Z/2-harmonic 1-form whose singular locus has exactly two connected components.
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