中文

Formulation of Quantum Theory Using Computable and Non-Computable Real Numbers

量子物理 2007-05-23 v1 混沌动力学

摘要

It is shown that in two-state quantum theory, a generic quantum state can be described by a non-computable real number. In terms of this, the criterion for measurement outcome is simply and deterministically defined. This demonstration is based on a construction of the Riemann sphere whose points represent, not complex numbers, but divergent sequences with bivalent elements. Complex structure arises from self-similar properties of a set of operators which generate these sequences. In general, a rotation of (the coordinates of) the sphere maps a computable real to a non-computable real. This is interpreted physically as a mapping of a physically-measurable state to a counterfactual state. Implications for non-locality, null measurements, many worlds and so on, are discussed. The possible role of the Euler equation as the counterpart of the Schrodinger equation for real-number quantum state evolution is also outlined.

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引用

@article{arxiv.quant-ph/0101007,
  title  = {Formulation of Quantum Theory Using Computable and Non-Computable Real Numbers},
  author = {T. N. Palmer},
  journal= {arXiv preprint arXiv:quant-ph/0101007},
  year   = {2007}
}

备注

27 pages, 1 eps figure