Class Number Formulas for Certain Biquadratic Fields
Abstract
We consider the class numbers of imaginary quadratic extensions , for certain primes , of totally real quadratic fields which have class number one. Using seminal work of Shintani, we obtain two elementary class number formulas for many such fields. The first expresses the class number as an alternating sum of terms that we generate from the coefficients of the power series expansions of two simple rational functions that depend on the arithmetic of and . The second makes use of expansions of , where is a prime such that and remains inert in . More precisely, for a generator of the totally positive unit group of , the base- expansion of has period length , and our second class number formula expresses the class number as a finite sum over disjoint cosets of size .
Keywords
Cite
@article{arxiv.2309.04066,
title = {Class Number Formulas for Certain Biquadratic Fields},
author = {Elizabeth Athaide and Emma Cardwell and Christina Thompson},
journal= {arXiv preprint arXiv:2309.04066},
year = {2023}
}
Comments
27pages, 2tables