Nodal resolution of quasiregular curves via bubble trees

Abstract

We prove a version of Gromov's compactness theorem for quasiregular curves into calibrated manifolds with bounded geometry. In our main theorem, given an n-dimensional calibration ω on manifold N, we associate to a weak- limit μ = k ∞ Fk*ω of measures induced by a sequence (Fk X N)k∈ N of K-quasiregular ω-curves on a nodal manifold X, a bubble tree X over X, a sequence of mappings ( F X N) ∈ N converging locally uniformly to a quasiregular curve F X N which realizes the measure μ, that is, μ = π*( F*ω), where π X X is the natural projection. We call the sequence ( F) ∈ N a nodal resolution of the sequence (Fk)k∈ N. As a corollary we obtain a normality criterion for families of quasiregular curves. Classic interpretations of bubbling via Gromov--Hausdorff convergence and pinching maps also follow.

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