Upper bounds on class numbers of real quadratic fields
Abstract
We prove that, for any >0, the number of real quadratic fields Q(d) of discriminant d<x whose class number is d(d)-2(d)-1 is at least x1/2- for x large enough. This improves by a factor d a result from 1971 by Yamamoto. We also establish a similar estimate for m-tuples of discriminants for any m≥ 1. Finally, we provide algebraic conditions to give a lower bound for the size of the fundamental unit of Q(d), generalizing a criterion by Yamamoto. Our proof corrects a work of Halter-Koch.
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