(INV) condition and regularity of the inverse
Abstract
Let f ' be a Sobolev mapping of finite distortion between planar domains and ', satisfying the (INV) condition and coinciding with a homeomorphism near ∂ . We show that f admits a generalized inverse mapping h ' , which is also a Sobolev mapping of finite distortion and satisfies the (INV) condition. We also establish a higher-dimensional analogue of this result: if a mapping f ' of finite distortion is in the Sobolev class W1,p(, Rn) with p > n-1 and satisfies the (INV) condition, then f has an inverse in W1,1(', Rn) that is also of finite distortion. Furthermore, we characterize Sobolev mappings satisfying (INV) whose generalized inverses have finite n-harmonic energy.
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