Baracco, Luca; Zaitsev, Dmitri; Zampieri, Giuseppe 'A Burns-Krantz type theorem for domains with corners' in Mathematische Annalen, 336, (3), 2006, pp 1432 - 1807
Mathematische Annalen 336 3
The goal of this paper is twofold. First, to give purely local boundary uniqueness results for maps defined only on one side as germs at a boundary point and hence not necessarily sending any domain to itself and also under the weaker assumption that $f(z)=z+o(|z-p|^3)$ holds only for $z$ in a proper cone in $D$ with vertex $p$. Such results have no analogues in one complex variable in contrast to the situation when a domain is preserved. And second, to extend the above results from boundaries of domains to submanifolds of higher codimension.
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