Branch points of split degenerate superelliptic curves II: on a conjecture of Gerritzen and van der Put
Abstract
Let K be a field with a discrete valuation, and let p be a prime. It is known that if 0 < PGL2(K) is a Schottky group normally contained in a larger group which is generated by order-p elements each fixing 2 points ai, bi ∈ PK1, then the quotient of a certain subset of the projective line PK1 by the action of can be algebraized as a superelliptic curve C : yp = f(x) / K. The subset S ⊂ K \∞\ consisting of these pairs ai, bi of fixed points is mapped bijectively modulo to the set B of branch points of the superelliptic map x : C PK1. A conjecture of Gerritzen and van der Put, in the case that C is hyperelliptic and K has residue characteristic ≠ 2, compares the cluster data of S with that of B. We show that this conjecture requires a slight modification in order to hold and then prove a much stronger version of the modified conjecture that holds for any p and any residue characteristic.
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