Bubbling of quasiregular maps
Abstract
We give a version of Gromov's compactess theorem for pseudoholomorphic curves in the case of quasiregular mappings between closed manifolds. More precisely we show that, given K 1 and D 1, any sequence (fn M N) of K-quasiregular mappings of degree D between closed Riemannian d-manifolds has a subsequence which converges to a K-quasiregular mapping f X N of degree D on a nodal d-manifold X.
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