Exotic smooth R^4, noncommutative algebras and quantization

Details Exotic smooth R^4, noncommutative algebras and quantization Exotic smooth R^4, noncommutative algebras and quantization

2010-01-06

arxiv.org/abs/1001.0882v2

Physics

High Energy Physics

High Energy Physics - Theory

31 pages, 6 figures, svjour style, argumentation about closed transversals modified (sec. 4.2)

Scientific paper

The paper shows deep connections between exotic smoothings of small R^4, 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 R^4. Certain exotic smooth R^4'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 R^4 and conjecture that this factor is the unique hyperfinite factor III_1. We also show how an exotic smoothing of a small R^4 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 (K_t(S),[,]) for the deformation parameter t=exp(h/4). This skein algebra is retrieved as a II_1 factor of horocycle flows which is Morita equivalent to the II_infty factor von Neumann algebra which in turn determines the unique factor III_1 as crossed product. Moreover, the structure of Casson handles determine the factor II_1 algebra too. Thus, the quantization of the Poisson algebra of closed circles in a leaf of the codimension 1 foliation of S^3 gives rise to the factor III_1 associated with exotic smoothness of R^4. 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.

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