A simple proof of an expansion of an eta-quotient as a Lambert series
From MaRDI portal
Publication:5315944
DOI10.1017/S000497270003834XzbMath1078.33020MaRDI QIDQ5315944
Publication date: 12 September 2005
Published in: Bulletin of the Australian Mathematical Society (Search for Journal in Brave)
Theta series; Weil representation; theta correspondences (11F27) Holomorphic modular forms of integral weight (11F11) Dedekind eta function, Dedekind sums (11F20) Elliptic functions and integrals (33E05)
Related Items (4)
Rational analogues of Ramanujan's series for 1/π ⋮ Pairs of eta-quotients with dual weights and their applications ⋮ Supersingular parameters of the Deuring normal form ⋮ When is the derivative of an eta quotient another eta quotient?
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Cubic theta functions.
- Cubic identities for theta series in three variables
- Cubic Analogues of the Jacobian Theta Function θ(z, q)
- Some Cubic Modular Identities of Ramanujan
- A New Identity for (q;q) 10 with an Application to Ramanujan's Partition Congruence Modulo 11
- A Cubic Counterpart of Jacobi's Identity and the AGM
This page was built for publication: A simple proof of an expansion of an eta-quotient as a Lambert series
