Exotic smooth R4, noncommutative algebras and quantization

Abstract

The paper shows deep connections between exotic smoothings of small R4, noncommutative algebras of foliations and quantization. At first, based on the close relation of foliations and noncommutative C*-algebras we show that cyclic cohomology invariants characterize some small exotic R4. Certain exotic smooth R4's define a generalized embedding into a space which is K-theoretic equivalent to a noncommutative Banach algebra. Furthermore, we show that a factor III von Neumann algebra is naturally related with nonstandard smoothing of a small R4 and conjecture that this factor is the unique hyperfinite factor III1. We also show how an exotic smoothing of a small R4 is related to the Drinfeld-Turaev (deformation) quantization of the Poisson algebra (X(S,SL(2,C),,) of complex functions on the space of flat connections X(S,SL(2,C) over a surface S, and that the result of this quantization is the skein algebra (Kt(S),[,]) for the deformation parameter t=exp(h/4). This skein algebra is retrieved as a II1 factor of horocycle flows which is Morita equivalent to the IIinfty factor von Neumann algebra which in turn determines the unique factor III1 as crossed product. Moreover, the structure of Casson handles determine the factor II1 algebra too. Thus, the quantization of the Poisson algebra of closed circles in a leaf of the codimension 1 foliation of S3 gives rise to the factor III1 associated with exotic smoothness of R4. Finally, the approach to quantization via exotic 4-smoothness is considered as a fundamental question in dimension 4 and compared with the topos approach to quantum theories.