E8-singularity, invariant theory and modular forms

Abstract

As an algebraic surface, the equation of E8-singularity x5+y3+z2=0 can be obtained from a quotient CY/SL(2, 13) over the modular curve X(13), where Y ⊂ CP5 is a complete intersection curve given by a system of SL(2, 13)-invariant polynomials and CY is a cone over Y. It is different from the Kleinian singularity C2/, where is the binary icosahedral group. This gives a negative answer to Arnol'd and Brieskorn's questions about the mysterious relation between the icosahedron and E8, i.e., the E8-singularity is not necessarily the Kleinian icosahedral singularity. In particular, the equation of E8-singularity possesses infinitely many kinds of distinct modular parametrizations, and there are infinitely many kinds of distinct constructions of the E8-singularity. They form a variation of the E8-singularity structure over the modular curve X(13), for which we give its algebraic version, geometric version, j-function version and the version of Poincar\'e homology 3-sphere as well as its higher dimensional lifting, i.e., Milnor's exotic 7-sphere. Moreover, there are variations of Q18 and E20-singularity structures over X(13). Thus, three different algebraic surfaces, the equations of E8, Q18 and E20-singularities can be realized from the same quotients CY/SL(2, 13) over the modular curve X(13) and have the same modular parametrizations.