论文标题

Schmidt的子空间定理,用于在代数品种的索引中移动超出态位置的超晶体位置

Schmidt's subspace theorem for moving hypersurface targets in subgeneral position with index in algebraic variety

论文作者

Cao, Tingbin, Van Thin, Nguyen

论文摘要

最近,Xie-Cao [15]获得了第二个主要定理,用于位于子属位置的移动超曲面,该指数扩展了RU [11]的结果。通过使用Son-Tan-Thin [13],Quang [9]和Xie-Cao [15]引起的一些方法,我们将提供一个施密特的子空间定理,用于将超源性靶标在次级属位置与索引相交的代数变体。我们的结果是由于Son-Tan-Thin [13]和Quang [9],Schmidt的子空间定理扩展。

Recently, Xie-Cao [15] obtained a Second Main Theorem for moving hypersurfaces located in subgeneral position with index which is extended the result of Ru [11]. By using some methods due to Son-Tan-Thin [13], Quang [9] and Xie-Cao [15], we shall give a Schmidt's Subspace Theorem for moving hypersurface targets in subgeneral position with index intersecting algebraic variety. Our result is a extension the Schmidt's Subspace Theorem due to Son-Tan-Thin [13] and Quang [9].

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