Dirichlet problem for weakly harmonic maps with rough data
Abstract
Weakly harmonic maps from a domain (the upper half-space or a bounded C1,α domain, α∈ (0,1]) into a smooth closed manifold are studied. Prescribing small Dirichlet data in either of the classes L∞(∂) or BMO(∂), we establish solvability of the resulting boundary value problems by means of a nonvariational method. As a by-product, solutions are shown to be locally smooth, C∞loc. Moreover, we show that boundary data can be chosen large in the underlying topologies if is smooth and bounded by perturbing strictly stable smooth harmonic maps.
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