Switch to: Citations

References in:

Comment on "How to protect the interpretation of the wave function against protective measurements" by Jos Uffink

Add references

You must login to add references.

The meaning of protective measurements.Yakir Aharonov, Jeeva Anandan & Lev Vaidman - 1996 - Foundations of Physics 26 (1):117-126.details Protective measurement, which we have introduced recently, allows one to observe properties of the state of a single quantum system and even the Schrödinger wave itself. These measurements require a protection, sometimes due to an additional procedure and sometimes due to the potential of the system itself The analysis of the protective measurements is presented and it is argued, contrary to recent claims, that they observe the quantum state and not the protective potential. Some other misunderstandings concerning our proposal are (...) also clarified. (shrink) Download Export citation Bookmark 31 citations
(1 other version)Protective Measurement and the Meaning of the Wave Function.Shan Gao - 2011details This article analyzes the implications of protective measurement for the meaning of the wave function. According to protective measurement, a charged quantum system has mass and charge density proportional to the modulus square of its wave function. It is shown that the mass and charge density is not real but effective, formed by the ergodic motion of a localized particle with the total mass and charge of the system. Moreover, it is argued that the ergodic motion is not continuous but (...) Download Export citation Bookmark 3 citations
Interpreting Quantum Mechanics in Terms of Random Discontinuous Motion of Particles.Shan Gao - unknowndetails This thesis is an attempt to reconstruct the conceptual foundations of quantum mechanics. First, we argue that the wave function in quantum mechanics is a description of random discontinuous motion of particles, and the modulus square of the wave function gives the probability density of the particles being in certain locations in space. Next, we show that the linear non-relativistic evolution of the wave function of an isolated system obeys the free Schrödinger equation due to the requirements of spacetime translation (...) Download Export citation Bookmark 23 citations
Derivation of the Meaning of the Wave Function.Shan Gao - 2011details We show that the physical meaning of the wave function can be derived based on the established parts of quantum mechanics. It turns out that the wave function represents the state of random discontinuous motion of particles, and its modulus square determines the probability density of the particles appearing in certain positions in space. Download Export citation Bookmark 5 citations

1