Semi periodic maps on complex manifolds

In this letter we proved this theorem: \emph{if $F$ be a holomorphic mapping of $T_{\Omega}$ to a mapping manifold $X$ such that for every compact subset $K\subset \Omega$ the mapping $F$ is uniformly continues on $T_{K}$ and $F(T_{K})$ is a relatively compact subset of $X$. If the restriction of $F...

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Hauptverfasser:	Abadi, Ali Reza Khatoon, Rezazadeh, H. R, Golgoii, F
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Schlagworte:	Mathematics - Classical Analysis and ODEs
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creator	Abadi, Ali Reza Khatoon Rezazadeh, H. R Golgoii, F
description	In this letter we proved this theorem: \emph{if $F$ be a holomorphic mapping of $T_{\Omega}$ to a mapping manifold $X$ such that for every compact subset $K\subset \Omega$ the mapping $F$ is uniformly continues on $T_{K}$ and $F(T_{K})$ is a relatively compact subset of $X$. If the restriction of $F(z)$ to some hyperplane $\mathbb{R}^{m}+iy'$ is semi periodic, then $F(z)$ is an semi mapping of $T_{\Omega}$ to $X$.}
doi_str_mv	10.48550/arxiv.1011.5728
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title	Semi periodic maps on complex manifolds
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