Lifting for manifold-valued maps of bounded variation
Abstract
Let N be a smooth, compact, connected Riemannian manifold without boundary. Let E be the Riemannian universal covering of N. For any bounded, smooth domain ⊂eqRd and any u∈BV(, \, N), we show that u has a lifting v∈BV(, \, E). Our result proves a conjecture by Bethuel and Chiron.
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