An infinite product on the Teichm\"uller space of the once-punctured torus

Abstract

We prove the identity Πγ(el(γ)+1el(γ)-1)2h=(l1+l2+l32), (or Πγ(t(γ)2t(γ)2-4)h=t1+t12-42·t2+t22-42·t3+t32-42 in trace coordinates), where the product is over all simple closed geodesics on the once-punctured torus, l(γ)=2arccosh(t(γ)/2) is the length of the geodesic, and li (ti) are the lengths (traces) of any triple of simple geodesics \γi\ intersecting at a single point. The exponent h=h(γ;\γi\) is a positive integer "height" which increases as we move away from the chosen triple \γi\ in its orbit under SL2(Z) (see Figure 1 for the "definition by picture"). For comparison, a short proof of McShane's identity Σγ11+el(γ)=12=Σγ1-1-4/t(γ)22 in the same spirit is given in an appendix. Both proofs are elementary and proceed by "integrating" around the chosen triple \γi\ in its Teichm\"uller orbit.