On Class Numbers of Real Quadratic Fields with Certain Fundamental Discriminants

@inproceedings{Pekin2015OnCN,
  title={On Class Numbers of Real Quadratic Fields with Certain Fundamental Discriminants},
  author={Ayten Pekin and Aydın Carus},
  year={2015}
}
Let $ N$ denote the sets of positive integers and $ D \in N$ be square free, and let $\chi_D$ ,  $ h = h ( D )$ denote the non-trivial Dirichlet character, the class number of the real quadratic eld $ K = Q\sqrt (D)$, respectively  ONO, proved the theorem in [8] by applying Sturm's Theorem on the congruence of modular form to Cohen's half integral weight modular forms. Later, Dongho Byeon proved a theorem and corollary in [1] by rening Ono' methods.  In this paper, we will give a theorem for… CONTINUE READING