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引用次数: 4

摘要

朗伯特W函数拥有以索引k标记的分支。因此,W的值取决于它的参数z的值和它的分支索引的值。给定两个分支,标记为n和m,分支差是两个分支之间的差,当它们在相同的参数z处求值时。表明初等反函数具有平凡的分支差,但Lambert W具有非平凡的差异。对于实参数,反正弦函数具有实值分支差,而自然对数函数具有纯虚分支差。然而,Lambert W函数既有实值差,也有复值差。给出了W的分支差的应用和表示。
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Branch Differences and Lambert W
The Lambert W function possesses branches labelled by an index k. The value of W therefore depends upon the value of its argument z and the value of its branch index. Given two branches, labelled n and m, the branch difference is the difference between the two branches, when both are evaluated at the same argument z. It is shown that elementary inverse functions have trivial branch differences, but Lambert W has nontrivial differences. The inverse sine function has real-valued branch differences for real arguments, and the natural logarithm function has purely imaginary branch differences. The Lambert W function, however, has both real-valued differences and complex-valued differences. Applications and representations of the branch differences of W are given.
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