Abstract
In this paper we prove that every weak and strong local minimizer of the functional where , f grows like , g grows like and 1 , is on an open subset of Ω such that . Such functionals naturally arise from nonlinear elasticity problems. The key point in order to obtain the partial regularity result is to establish an energy estimate of Caccioppoli type, which is based on an appropriate choice of the test functions. The limit case is also treated for weak local minimizers.
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