English

Elliptic function of level 4

Complex Variables 2018-03-13 v1 Algebraic Topology

Abstract

The work is dedicated to the theory of elliptic functions of level nn. An elliptic function of level nn determines a Hirzebruch genus that is called elliptic genus of level nn. Elliptic functions of level nn are also interesting as solutions of Hirzebruch functional equations. The elliptic function of level 22 is the Jacobi elliptic sine. It determines the famous Ochanine--Witten genus. It is the exponential of the universal formal group of the form F(u,v)=u2v2uB(v)vB(u),B(0)=1. F(u,v)=\frac{u^2 -v^2}{u B(v) - v B(u)}, \quad B(0) = 1. The elliptic function of level 33 is the exponential of the universal formal group of the form F(u,v)=u2A(v)v2A(u)uA(v)2vA(u)2,A(0)=1,A"(0)=0. F(u,v)=\frac{u^2 A(v) -v^2 A(u)}{u A(v)^2 - v A(u)^2}, \qquad A(0) = 1, \quad A"(0) = 0. In this work we have obtained that the elliptic function of level 44 is the exponential of the universal formal group of the form F(u,v)=u2A(v)v2A(u)uB(v)vB(u), where A(0)=B(0)=1, F(u,v)=\frac{u^2 A(v) -v^2 A(u)}{u B(v)-v B(u)}, \text{ where } A(0) = B(0) = 1, and for B(0)=A"(0)=0,A(0)=A1,B"(0)=2B2B'(0) = A"(0) = 0, A'(0) = A_1, B"(0) = 2 B_2 the relation holds (2B(u)+3A1u)2=4A(u)3(3A128B2)u2A(u)2. (2 B(u) + 3 A_1 u)^2 = 4 A(u)^3 - (3 A_1^2 - 8 B_2) u^2 A(u)^2. To prove this result we have expressed the elliptic function of level 44 in terms of Weierstrass elliptic functions.

Cite

@article{arxiv.1605.07995,
  title  = {Elliptic function of level 4},
  author = {Elena Yu. Bunkova},
  journal= {arXiv preprint arXiv:1605.07995},
  year   = {2018}
}
R2 v1 2026-06-22T14:09:33.059Z