Algebraic functions and class number formulas
Abstract
A class number formula is proved for extended ring class fields LO,9 over imaginary quadratic fields Kd = Q(-d), in which the prime p = 3 splits, by determining the fields generated by the periodic points of a well-chosen algebraic function. The number of periodic points of a given period n 2 for this algebraic function equals six times the sum of class numbers of imaginary quadratic orders R-d, for which the Artin symbol for a prime ideal divisor 3 in Kd of 3 has order n in the Galois group of Fd/Kd, where Fd is the inertia field of 3 in LO,9/Kd.
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