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Pilot wave theory

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Couder's disputed[1] experiments,[2][3] purportedly "materializing" the pilot wave model.

In theoretical physics, the pilot wave theory, also known as Bohmian mechanics, was the first known example of a hidden-variable theory, presented by Louis de Broglie in 1927. Its more modern version, the de Broglie–Bohm theory, interprets quantum mechanics as a deterministic theory, and avoids issues such as wave–particle duality, instantaneous wave function collapse, and the paradox of Schrödinger's cat by being inherently nonlocal.

The de Broglie–Bohm pilot wave theory is one of several interpretations of (non-relativistic) quantum mechanics.

History

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Louis de Broglie's early results on the pilot wave theory were presented in his thesis (1924) in the context of atomic orbitals where the waves are stationary. Early attempts to develop a general formulation for the dynamics of these guiding waves in terms of a relativistic wave equation were unsuccessful until in 1926 Schrödinger developed his non-relativistic wave equation. He further suggested that since the equation described waves in configuration space, the particle model should be abandoned.[4] Shortly thereafter,[5] Max Born suggested that the wave function of Schrödinger's wave equation represents the probability density of finding a particle. Following these results, de Broglie developed the dynamical equations for his pilot wave theory.[6] Initially, de Broglie proposed a double solution approach, in which the quantum object consists of a physical wave (u-wave) in real space which has a spherical singular region that gives rise to particle-like behaviour; in this initial form of his theory he did not have to postulate the existence of a quantum particle.[7] He later formulated it as a theory in which a particle is accompanied by a pilot wave.

De Broglie presented the pilot wave theory at the 1927 Solvay Conference.[8] However, Wolfgang Pauli raised an objection to it at the conference, saying that it did not deal properly with the case of inelastic scattering. De Broglie was not able to find a response to this objection, and he abandoned the pilot-wave approach. Unlike David Bohm years later, de Broglie did not complete his theory to encompass the many-particle case.[7] The many-particle case shows mathematically that the energy dissipation in inelastic scattering could be distributed to the surrounding field structure by a yet-unknown mechanism of the theory of hidden variables.[clarification needed]

In 1932, John von Neumann published a book,[9] part of which claimed to prove that all hidden variable theories were impossible. This result was found to be flawed by Grete Hermann[10][11] three years later, though for a variety of reasons this went unnoticed by the physics community for over fifty years.

In 1952, David Bohm, dissatisfied with the prevailing orthodoxy, rediscovered de Broglie's pilot wave theory. Bohm developed pilot wave theory into what is now called the de Broglie–Bohm theory.[12][13] The de Broglie–Bohm theory itself might have gone unnoticed by most physicists, if it had not been championed by John Bell, who also countered the objections to it. In 1987, John Bell rediscovered Grete Hermann's work,[14] and thus showed the physics community that Pauli's and von Neumann's objections only showed that the pilot wave theory did not have locality.

The pilot wave theory

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Principles

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(a) A walker in a circular corral. Trajectories of increasing length are colour-coded according to the droplet's local speed (b) The probability distribution of the walker's position corresponds roughly to the amplitude of the corral's Faraday wave mode.[15]

The pilot wave theory is a hidden-variable theory. Consequently:

  • the theory has realism (meaning that its concepts exist independently of the observer);
  • the theory has determinism.

The positions of the particles are considered to be the hidden variables. The observer doesn't know the precise values of these variables; they cannot know them precisely because any measurement disturbs them. On the other hand, the observer is defined not by the wave function of their own atoms but by the atoms' positions. So what one sees around oneself are also the positions of nearby things, not their wave functions.

A collection of particles has an associated matter wave which evolves according to the Schrödinger equation. Each particle follows a deterministic trajectory, which is guided by the wave function; collectively, the density of the particles conforms to the magnitude of the wave function. The wave function is not influenced by the particle and can exist also as an empty wave function.[16]

The theory brings to light nonlocality that is implicit in the non-relativistic formulation of quantum mechanics and uses it to satisfy Bell's theorem. These nonlocal effects can be shown to be compatible with the no-communication theorem, which prevents use of them for faster-than-light communication, and so is empirically compatible with relativity.[17]

Macroscopic analog

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Couder, Fort, et al. claimed[18] that macroscopic oil droplets on a vibrating fluid bath can be used as an analogue model of pilot waves; a localized droplet creates a periodical wave field around itself. They proposed that resonant interaction between the droplet and its own wave field exhibits behaviour analogous to quantum particles: interference in double-slit experiment,[19] unpredictable tunneling[20] (depending in a complicated way on a practically hidden state of field), orbit quantization[21] (that a particle has to 'find a resonance' with field perturbations it creates—after one orbit, its internal phase has to return to the initial state) and Zeeman effect.[22] Attempts to reproduce these experiments[23][24] have shown that wall-droplet interactions rather than diffraction or interference of the pilot wave may be responsible for the observed hydrodynamic patterns, which are different from slit-induced interference patterns exhibited by quantum particles.[25]

Mathematical foundations

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To derive the de Broglie–Bohm pilot-wave for an electron, the quantum Lagrangian

where is the potential energy, is the velocity and is the potential associated with the quantum force (the particle being pushed by the wave function), is integrated along precisely one path (the one the electron actually follows). This leads to the following formula for the Bohm propagator[citation needed]:

This propagator allows one to precisely track the electron over time under the influence of the quantum potential .

Derivation of the Schrödinger equation

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Pilot wave theory is based on Hamilton–Jacobi dynamics,[26] rather than Lagrangian or Hamiltonian dynamics. Using the Hamilton–Jacobi equation

it is possible to derive the Schrödinger equation:

Consider a classical particle – the position of which is not known with certainty. We must deal with it statistically, so only the probability density is known. Probability must be conserved, i.e. for each . Therefore, it must satisfy the continuity equation

where is the velocity of the particle.

In the Hamilton–Jacobi formulation of classical mechanics, velocity is given by where is a solution of the Hamilton-Jacobi equation

and can be combined into a single complex equation by introducing the complex function then the two equations are equivalent to

with

The time-dependent Schrödinger equation is obtained if we start with the usual potential with an extra quantum potential . The quantum potential is the potential of the quantum force, which is proportional (in approximation) to the curvature of the amplitude of the wave function.

Note this potential is the same one that appears in the Madelung equations, a classical analog of the Schrödinger equation.

Mathematical formulation for a single particle

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The matter wave of de Broglie is described by the time-dependent Schrödinger equation:

The complex wave function can be represented as:

By plugging this into the Schrödinger equation, one can derive two new equations for the real variables. The first is the continuity equation for the probability density [12]

where the velocity field is determined by the “guidance equation”

According to pilot wave theory, the point particle and the matter wave are both real and distinct physical entities (unlike standard quantum mechanics, which postulates no physical particle or wave entities, only observed wave-particle duality). The pilot wave guides the motion of the point particles as described by the guidance equation.

Ordinary quantum mechanics and pilot wave theory are based on the same partial differential equation. The main difference is that in ordinary quantum mechanics, the Schrödinger equation is connected to reality by the Born postulate, which states that the probability density of the particle's position is given by Pilot wave theory considers the guidance equation to be the fundamental law, and sees the Born rule as a derived concept.

The second equation is a modified Hamilton–Jacobi equation for the action S:

where Q is the quantum potential defined by

If we choose to neglect Q, our equation is reduced to the Hamilton–Jacobi equation of a classical point particle.[a] So, the quantum potential is responsible for all the mysterious effects of quantum mechanics.

One can also combine the modified Hamilton–Jacobi equation with the guidance equation to derive a quasi-Newtonian equation of motion

where the hydrodynamic time derivative is defined as

Mathematical formulation for multiple particles

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The Schrödinger equation for the many-body wave function is given by

The complex wave function can be represented as:

The pilot wave guides the motion of the particles. The guidance equation for the jth particle is:

The velocity of the jth particle explicitly depends on the positions of the other particles. This means that the theory is nonlocal.

Relativity

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An extension to the relativistic case with spin has been developed since the 1990s.[27][28][29][30][31][32]

Empty wave function

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Lucien Hardy[33] and John Stewart Bell[16] have emphasized that in the de Broglie–Bohm picture of quantum mechanics there can exist empty waves, represented by wave functions propagating in space and time but not carrying energy or momentum,[34] and not associated with a particle. The same concept was called ghost waves (or "Gespensterfelder", ghost fields) by Albert Einstein.[34] The empty wave function notion has been discussed controversially.[35][36][37] In contrast, the many-worlds interpretation of quantum mechanics does not call for empty wave functions.[16]

See also

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Notes

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  1. ^ Strictly speaking, this is only a semiclassical limit;[clarification needed] because the superposition principle still holds, one needs a “decoherence mechanism” to get rid of it. Interaction with the environment can provide this mechanism.

References

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  1. ^ Wolchover, Natalie (11 October 2018). "Famous Experiment Dooms Alternative to Quantum Weirdness". Quanta Magazine. Retrieved 17 October 2018. Oil droplets guided by "pilot waves" have failed to reproduce the results of the quantum double-slit experiment
  2. ^ Couder, Y.; Boudaoud, A.; Protière, S.; Moukhtar, J.; Fort, E. (2010). "Walking droplets: a form of wave–particle duality at macroscopic level?" (PDF). Europhysics News. 41 (1): 14–18. Bibcode:2010ENews..41a..14C. doi:10.1051/epn/2010101.
  3. ^ "Yves Couder experiments explains Wave/Particle Duality via silicon droplets". How Does The Universe Work?. Through the Wormhole. 13 July 2011. Archived from the original on 22 December 2021.
  4. ^ Valentini, Antony; Bacciagaluppi, Guido (24 September 2006). "Quantum Theory at the Crossroads: Reconsidering the 1927 Solvay Conference". arXiv:quant-ph/0609184.
  5. ^ Born, M. (1926). "Quantenmechanik der Stoßvorgänge". Zeitschrift für Physik. 38 (11–12): 803–827. Bibcode:1926ZPhy...38..803B. doi:10.1007/BF01397184. S2CID 126244962.
  6. ^ de Broglie, L. (1927). "La mécanique ondulatoire et la structure atomique de la matière et du rayonnement". Journal de Physique et le Radium. 8 (5): 225–241. Bibcode:1927JPhRa...8..225D. doi:10.1051/jphysrad:0192700805022500.
  7. ^ a b Dewdney, C.; Horton, G.; Lam, M. M.; Malik, Z.; Schmidt, M. (1992). "Wave–particle dualism and the interpretation of quantum mechanics". Foundations of Physics. 22 (10): 1217–1265. Bibcode:1992FoPh...22.1217D. doi:10.1007/BF01889712. S2CID 122894371.
  8. ^ Institut International de Physique Solvay (1928). Electrons et Photons: Rapports et Discussions du Cinquième Conseil de Physique tenu à Bruxelles du 24 au 29 Octobre 1927. Gauthier-Villars.
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  13. ^ Bohm, D. (1952). "A suggested Interpretation of the Quantum Theory in Terms of Hidden Variables, II". Physical Review. 85 (2): 180–193. Bibcode:1952PhRv...85..180B. doi:10.1103/PhysRev.85.180.
  14. ^ Bell, J. S. (1987). Speakable and Unspeakable in Quantum Mechanics. Cambridge University Press. ISBN 978-0521334952.
  15. ^ Harris, Daniel M.; Bush, John W. M. (2013). "The pilot-wave dynamics of walking droplets" (PDF). Physics of Fluids. 25 (9): 091112–091112–2. Bibcode:2013PhFl...25i1112H. doi:10.1063/1.4820128. hdl:1721.1/92913. S2CID 120607553. Archived from the original (PDF) on 27 November 2016. Retrieved 27 November 2016.
  16. ^ a b c Bell, J. S. (1992). "Six possible worlds of quantum mechanics". Foundations of Physics. 22 (10): 1201–1215. Bibcode:1992FoPh...22.1201B. doi:10.1007/BF01889711. S2CID 119542806.
  17. ^ Westman, Hans (29 October 2004). Topics in the Foundations of Quantum Theory and Relativity (PhD). University of Gothenburg. hdl:2077/16325.
  18. ^ Yves Couder . Explains Wave/Particle Duality via Silicon Droplets [Through the Wormhole], 2 August 2011, retrieved 26 August 2023
  19. ^ Couder, Yves; Fort, Emmanuel (2006). "Single-Particle Diffraction and Interference at a Macroscopic Scale". Physical Review Letters. 97 (15): 154101. Bibcode:2006PhRvL..97o4101C. doi:10.1103/PhysRevLett.97.154101. PMID 17155330.
  20. ^ Eddi, A.; Fort, E.; Moisy, F.; Couder, Y. (2009). "Unpredictable Tunneling of a Classical Wave-Particle Association". Physical Review Letters. 102 (24): 240401. Bibcode:2009PhRvL.102x0401E. doi:10.1103/PhysRevLett.102.240401. PMID 19658983.
  21. ^ Fort, E.; Eddi, A.; Boudaoud, A.; Moukhtar, J.; Couder, Y. (2010). "Path-memory induced quantization of classical orbits". PNAS. 107 (41): 17515–17520. arXiv:1307.6051. Bibcode:2010PNAS..10717515F. doi:10.1073/pnas.1007386107. PMC 2955113. S2CID 53462533.
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