On infinite-dimensional state spaces
Abstract
It is well-known that the canonical commutation relation can be realized only on an infinite-dimensional Hilbert space. While any finite set of experimental data can also be explained in terms of a finite-dimensional Hilbert space by approximating the commutation relation, Occam's razor prefers the infinite-dimensional model in which holds on the nose. This reasoning one will necessarily have to make in any approach which tries to detect the infinite-dimensionality. One drawback of using the canonical commutation relation for this purpose is that it has unclear operational meaning. Here, we identify an operationally well-defined context from which an analogous conclusion can be drawn: if two unitary transformations on a quantum system satisfy the relation , then finite-dimensionality entails the relation ; this implication strongly fails in some infinite-dimensional realizations. This is a result from combinatorial group theory for which we give a new proof. This proof adapts to the consideration of cases where the assumed relation holds only up to and then yields a lower bound on the dimension.
Cite
@article{arxiv.1202.3817,
title = {On infinite-dimensional state spaces},
author = {Tobias Fritz},
journal= {arXiv preprint arXiv:1202.3817},
year = {2013}
}
Comments
5+4 pages, minor revision, to appear in J. Math. Phys