The Igusa modular forms and ``the simplest'' Lorentzian Kac--Moody algebras
Abstract
We find automorphic corrections for the Lorentzian Kac--Moody algebras with the simplest generalized Cartan matrices of rank 3: A1,0 = 2 0 -1 0 2 -2 -1 -2 2 and A1,I = 2 -2 -1 -2 2 -1 -1 -1 2 For A1,0 this correction is given by the Igusa Sp4(Z)-modular form 35 of weight 35, and for A1,I by a Siege modular form of weight 30 with respect to a 2-congruence subgroup. We find infinite product or sum expansions for these forms. Our method of construction of 35 leads to the direct construction of Siegel modular forms by infinite product expansions, whose divisors are the Humbert surfaces with fixed discriminants. Existence of these forms was proved by van der Geer in 1982 using some geometrical consideration. We announce a list of all hyperbolic symmetric generalized Cartan matrices A of rank 3 such that A has elliptic or parabolic type, A has a lattice Weyl vector, and A contains the affine submatrix A1.
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