Sketch of a Program for Universal Automorphic Functions to Capture Monstrous Moonshine

Abstract

We review and reformulate old and prove new results about the triad PPSL2( Z)⊂eq PPSL2( R) ppsl2( R) , which provides a universal generalization of the classical automorphic triad PSL2( Z)⊂eq PSL2( R) psl2( R). The leading P or p in the universal setting stands for piecewise, and the group PPSL2( Z) plays at once the role of universal modular group, universal mapping class group, Thompson group T and Ptolemy group. We produce a new basis of the Lie algebra ppsl2( R), compute its structure constants, define a central extension which is compared with the Weil-Petersson 2-form, and discuss its representation theory. We construct and study new framed holographic coordinates on the universal Teichm\"uller space and its symmetry group PPSL2( R), and construct an invariant 1-form as its Maurer-Cartan form analogous to the invariant Eisenstein 1-form E2(z)dz, which gives rise to the spin 1 representation of psl2( R) extended by the trivial representation. This suggests the full program for developing the theory of universal automorphic functions conjectured to yield the bosonic CFT2. Relaxing the automorphic condition to the commutant leads to our ultimate conjecture on realizing the Monster CFT2 via the automorphic representation for the universal triad. This conjecture is also bolstered by the links of both the universal Teichm\"uller and the Monster CFT2 theories to the three-dimensional quantum gravity.