Uncertainty reconciles complementarity with joint measurability
Abstract
The fundamental principles of complementarity and uncertainty are shown to be related to the possibility of joint unsharp measurements of pairs of noncommuting quantum observables. A joint measurement scheme for complementary observables is proposed. The measured observables are represented as positive operator valued measures (POVMs), whose intrinsic fuzziness parameters are found to satisfy an intriguing pay-off relation reflecting the complementarity. At the same time, this relation represents an instance of a Heisenberg uncertainty relation for measurement imprecisions. A model-independent consideration shows that this uncertainty relation is logically connected with the joint measurability of the POVMs in question.
- Publication:
-
Physical Review A
- Pub Date:
- September 2003
- DOI:
- arXiv:
- arXiv:quant-ph/0207081
- Bibcode:
- 2003PhRvA..68c4102B
- Keywords:
-
- 03.65.Ta;
- 03.65.Ca;
- 03.65.Wj;
- 03.65.Ud;
- Foundations of quantum mechanics;
- measurement theory;
- Formalism;
- State reconstruction quantum tomography;
- Entanglement and quantum nonlocality;
- Quantum Physics
- E-Print:
- 4 pages, RevTeX. Title of previous version: "Complementarity and uncertainty - entangled in joint path-interference measurements". This new version focuses on the "measurement uncertainty relation" and its role, disentangling this issue from the special context of path interference duality. See also http://www.vjquantuminfo.org (October 2003)