Classification of area-strict limits of planar BV homeomorphisms
Abstract
We present a classification of area-strict limits of planar BV homeomorphisms. This class of mappings allows for cavitations and fractures but fulfil a suitable generalization of the INV condition. As pointed out by J. Ball [4], these features are expected in limit configurations of elastic deformations. In [12], De Philippis and Pratelli introduced the no-crossing condition which characterizes the W1,p closure of planar homeomorphisms. In the current paper we show that a suitable version of this concept is equivalent with a map, f, being the area-strict limit of BV homeomorphisms. This extends our results from [10], where we proved that the no-crossing BV condition for a BV map was equivalent with the map being the m-strict limit of homeomorphisms (i.e. fk converges w* to f and |D1fk|()+|D2fk|() |D1f|()+|D2f|()). Further we show that the no-crossing BV condition is equivalent with a seemingly stronger version of the same condition.
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