The Latent Meaning of Forcing in Quantum Mechanics

P. Klimasara, K. Bielas, J. Król, T. Asselmeyer-Maluga
2016 Acta Physica Polonica B  
We analyze random forcing in QM from the dual perspective of the measure and category correspondence. The dual Cohen forcing allows interpreting the real numbers in a model M and its Cohen extension M [G] as absolute subtrees of the binary tree (Cantor space). The trees are spanning non-trivial Casson handles of smooth exotic 4-manifolds, like R 4 . We formulate the consequences for the cosmological model with random forcing where dual smooth non-standard and non-flat Riemannian geometries have
more » ... ian geometries have to appear.
doi:10.5506/aphyspolb.47.1685 fatcat:4kzcdywihjcnhjhxhrk455klfa