Abstract
For a bounded Lipschitz domain a minimization problem is considered over functions of the Orlicz-Sobolev space generated by an N-function A (with Δ2-property) that have prescribed trace u 0. Regularity results are established. In the vector case N > 1, partial C 1,α-regularity is proved without any additional structural conditions. The results are easily extended to the case of locally minimizing mappings. In the scalar case, the results obtained cover the case of (double) obstacles. Under an additional assumption, the regularity results can be improved (cf. Theorem 3 below which admits the anisotropic two-dimensional vector case).
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