An identity connecting theta series associated with binary quadratic forms of discriminant and (prime)2

Abstract

We state and prove an identity which connects theta series associated with binary quadratic forms of idoneal discriminants and p2, for p a prime. Employing this identity, we extend the results of Toh by writing the theta series of forms of discriminant p2 as a linear combination of Lambert series. We then use these Lambert series decompositions to give explicit representation formulas for the forms of discriminant p2. Lastly, we give a generalization of our main identity, which employs a map of Buell to connect forms of discriminant to p2. Our generalized identity links theta series associated with a single form of discriminant to a theta series associated with forms of discriminant p2, where and p2 are no longer required to be idoneal.