Author:
de Gosson Maurice,de Gosson Charlyne
Abstract
AbstractWe use the notion of polar duality from convex geometry and the theory of Lagrangian planes from symplectic geometry to construct a fiber bundle over ellipsoids that can be viewed as a quantum-mechanical substitute for the classical symplectic phase space. The total space of this fiber bundle consists of geometric quantum states, products of convex bodies carried by Lagrangian planes by their polar duals with respect to a second transversal Lagrangian plane. Using the theory of the John ellipsoid we relate these geometric quantum states to the notion of “quantum blobs” introduced in previous work; quantum blobs are the smallest symplectic invariant regions of the phase space compatible with the uncertainty principle. We show that the set of equivalence classes of unitarily related geometric quantum states is in a one-to-one correspondence with the set of all Gaussian wavepackets. We emphasize that the uncertainty principle appears in this paper as geometric property of the states we define, and is not expressed in terms of variances and covariances, the use of which was criticized by Hilgevoord and Uffink.
Publisher
Springer Science and Business Media LLC
Subject
General Physics and Astronomy
Reference26 articles.
1. Arnold, V.I.: Mathematical Methods of Classical Mechanics, vol. 60. Springer, New York (2013)
2. Artstein, S., Klartag, B., Milman, V.: The Santaló point of a function, and a functional form of the Santaló inequality. Mathematika 51(1–2), 33–48 (2004)
3. Artstein-Avidan, S., Milman, V.D., Ostrover, Y.: The M-ellipsoid, symplectic capacities and volume. Comment. Math. Helv. 83(2), 359–369 (2008)
4. Artstein-Avidan, S., Karasev, R., Ostrover, Y.: From symplectic measurements to the Mahler conjecture. Duke Math. J. 163(11), 2003–2022 (2014)
5. Aubrun, G., Szarek, S.J.: Alice and Bob Meet Banach, vol. 223. American Mathematical Society, Providence (2017)
Cited by
2 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献