Towards superconformal and quasi-modular representation of exotic smooth R4 from superstring theory I

Abstract

We show that superconformal N=4,2 algebras are well-suited to represent some invariant constructions characterizing exotic R4 relative to a given radial family. We examine the case of N=4, c=4 (at r=1 level) superconformal algebra which is realized on flat R4 and curved S3× R. While the first realization corresponds naturally to standard smooth R4 the second describes the algebraic end of some small exotic smooth R4's from the radial family of DeMichelis-Freedman and represents the linear dilaton background SU(2)k× RQ of superstring theory. From the modular properties of the characters of the algebras one derives Witten-Reshetikhin-Turaev and Chern-Simons invariants of homology 3-spheres. These invariants are represented rather by false, quasi-modular, Ramanujan mock-type functions. Given the homology 3-spheres one determines exotic smooth structures of Freedman on S3× R. In this way the fake ends are related to the SCA N=4 characters. The case of the ends of small exotic R4's is more complicated. One estimates the complexity of exotic R4 by the minimal complexity of some separating from the infinity 3-dimensional submanifold. These separating manifolds can be chosen, in some exotic R4's, to be homology 3-spheres. The invariants of such homology 3-spheres are, again, obtained from the characters of SCA, N=4. Next we take into account the modification of the algebra of modular forms due to the noncommutativity of the codimension-one foliations of the homology 3-spheres. Then, the modification of modular forms is represented by the Connes-Moscovici construction ...