On the representation numbers of ternary quadratic forms and modular forms of weight \(3/2\) (Q401990)

In this work, the authors deal with the representation numbers of ternary quadratic forms and modular forms of weight \(3/2\). They obtain the following theorem which is related to the genus identity of \textit{A. Berkovich} and \textit{W. C. Jagy} [J. Number Theory 132, No. 1, 258--274 (2012; Zbl 1245.11049)].NEWLINENEWLINE{Theorem 2.1.} The theta series \(\theta (z),\theta _{1}(z),\theta _{2}(z)\) are linearly independent in the space \(\mathcal E (4p,\mathrm{id})\) and NEWLINE\[NEWLINE \psi _{p}(z)=p\theta (z)+48\theta _{1}(z)-96\theta _{2}(z), NEWLINE\]NEWLINE where \(\mathcal E (4p, \mathrm{id})\) is the orthogonal complement to the subspace of cusp forms in the complex linear space of modular forms of weight \(3/2\), level \(4p\) and trivial character.NEWLINENEWLINENEWLINEAlso they deduce some lemmas and propositions.