English

Algebraic Hypergeometric Transformations of Modular Origin

Number Theory 2007-06-14 v3 Classical Analysis and ODEs

Abstract

It is shown that Ramanujan's cubic transformation of the Gauss hypergeometric function 2F1{}_2F_1 arises from a relation between modular curves, namely the covering of X0(3)X_0(3) by X0(9)X_0(9). In general, when 2N72\le N\le 7 the N-fold cover of X0(N)X_0(N) by X0(N2)X_0(N^2) gives rise to an algebraic hypergeometric transformation. The N=2,3,4 transformations are arithmetic-geometric mean iterations, but the N=5,6,7 transformations are new. In the final two the change of variables is not parametrized by rational functions, since X0(6),X0(7)X_0(6),X_0(7) are of genus 1. Since their quotients X0+(6),X0+(7)X_0^+(6),X_0^+(7) under the Fricke involution (an Atkin-Lehner involution) are of genus 0, the parametrization is by two-valued algebraic functions. The resulting hypergeometric transformations are closely related to the two-valued modular equations of Fricke and H. Cohn.

Keywords

Cite

@article{arxiv.math/0501425,
  title  = {Algebraic Hypergeometric Transformations of Modular Origin},
  author = {Robert S. Maier},
  journal= {arXiv preprint arXiv:math/0501425},
  year   = {2007}
}

Comments

Final version, 27 pages, accepted by Transactions of the AMS. Some typos and equation formatting problems fixed