Question

Suppose that a curve $C$ on the $z$ plane avoids the branch points and the non-uniqueness points of the function $w(z)$. Prove that moving along the curve $C$, starting from distinct sheets of the scheme of the Riemann surface of function $w(z)$, one arrives at distinct sheets. 

   Suppose that a curve $C$ on the $z$ plane avoids the branch points and the non-uniqueness points of the function $w(z)$. Prove that moving along the curve $C$, starting from distinct sheets of the scheme of the Riemann surface of function $w(z)$, one arrives at distinct sheets.
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Abel'S Theorem in Problems and Solutions Based on the Lectures of Professor V.I. Arnold
Abel'S Theorem in Problems and Solutions Based on the Lectures of Professor V.I. Arnold
V.B. Alekseev,… 1st Edition
Chapter 2, Problem 329 ↓

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We are dealing with a complex function \( w(z) \) that has a Riemann surface structure. The Riemann surface allows for multiple sheets, which correspond to different values of \( w(z) \) for the same \( z \) in the complex plane. The branch points are locations  Show more…

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Suppose that a curve $C$ on the $z$ plane avoids the branch points and the non-uniqueness points of the function $w(z)$. Prove that moving along the curve $C$, starting from distinct sheets of the scheme of the Riemann surface of function $w(z)$, one arrives at distinct sheets.
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