@inbook{10.4169/j.ctt5hh823.8,
ISBN = {9780883850480},
URL = {http://www.jstor.org/stable/10.4169/j.ctt5hh823.8},
abstract = {A. Then-Function and the Function Φ(M) . The functionn(τ) defined in Chapter 1 (see (3)) and now generally known as the Dedekindn-function, appears already in the work of Jacobi and Weierstrass on elliptic functions in the form(54)$\Delta (\tau ) = Cn{(\tau )^{24}}$.HereCis an unimportant numerical constant. Actually, if one uses the proper normalization (see, e.g. [31], p. 108), thenC= 1. This function has to do with the pattern of periods of the elliptic functions represented by the point lattice$\Omega = \left\{ {{m_1}{\omega _1} + {m_2}{\omega _2}} \right\}$.Here${\omega _1}$and${\omega _2}$are two generators of the point lattice and${m_1},{m_2}$run independently through},
bookauthor = {HANS RADEMACHER and EMIL GROSSWALD},
booktitle = {Dedekind Sums},
edition = {1},
pages = {45--63},
publisher = {Mathematical Association of America},
title = {DEDEKIND SUMS AND MODULAR TRANSFORMATIONS},
volume = {16},
year = {1972}
}