Paper 2, Section II, G
Given a complete analytic function on a domain , describe briefly how the space of germs construction yields a Riemann surface associated to together with a covering map (proofs not required).
In the case when is regular, explain briefly how, given a point , any closed curve in with initial and final points yields a permutation of the set .
Now consider the Riemann surface associated with the complete analytic function
on , with regular covering map . Which subgroup of the full symmetric group of is obtained in this way from all such closed curves (with initial and final points ?
Typos? Please submit corrections to this page on GitHub.