Joseph Lewittes
Published 2015-02-17Version 1
It is shown that the class number for negative discriminant $D$ can be expressed in terms of the base $B$ expansions of reduced fractions $\frac{x}{|D|}$, where $B$ is an integer prime to $D$. This result is then formulated to obtain information about the distribution of the values of $\chi(x)$, where $\chi$ is the quadratic character associated to $D$. This leads to simplified formulas for the class number in certain cases.
2-universal Hermitian lattices over imaginary quadratic fields
Imaginary quadratic fields with 2-class group of type $(2,2^\ell)$
On the divisibility of the class numbers and discriminants of imaginary quadratic fields
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