A uniqueness theorem for meromorphic mappings with a small set of identity (Q2518783)

In 1983, \textit{L. M. Smiley} [Contemp. Math. 25, 149--154 (1983; Zbl 0571.32002)] showed a theorem related to linearly nondegenerate meromorphic mappings of \(\mathbb C^{n}\) into \(\mathbb C\mathbb{P}^{n}\). In the past years, the authors and others extended this result to the case where the number of hyperplanes is replaced by a small one and multiplicities are truncated by a positive integer bigger than \(1\). There are now many different results for the uniqueness problem with few hyperplanes. The main purpose of this paper is to give a uniqueness theorem for meromorphic mappings of \(\mathbb C^{m}\) into \(\mathbb C\mathbb{P}^{n}\) with truncated multiplicities and a smaller set of identity, in particular, the number of hyperplanes will be only \((n+1)\). The authors' methods are quite different from those used in the proofs of previous unicity theorems. This comes from the fact that with only \((n+1)\) hyperplanes, the authors can not use the second main theorem for meromorphic mappings and hyperplanes any more.