Relativity Pilot-wave theory is explicitly nonlocal, which is in ostensible conflict with
special relativity. Various extensions of "Bohm-like" mechanics exist that attempt to resolve this problem. Bohm himself in 1953 presented an extension of the theory satisfying the
Dirac equation for a single particle. However, this was not extensible to the many-particle case because it used an absolute time. A renewed interest in constructing
Lorentz-invariant extensions of Bohmian theory arose in the 1990s; see
Bohm and Hiley: The Undivided Universe and references therein. Another approach is given by Dürr et al., who use Bohm–Dirac models and a Lorentz-invariant foliation of space-time. Thus, Dürr et al. (1999) showed that it is possible to formally restore Lorentz invariance for the Bohm–Dirac theory by introducing additional structure. This approach still requires a
foliation of space-time. While this is in conflict with the standard interpretation of relativity, the preferred foliation, if unobservable, does not lead to any empirical conflicts with relativity. In 2013, Dürr et al. suggested that the required foliation could be covariantly determined by the wavefunction. The relation between nonlocality and preferred foliation can be better understood as follows. In de Broglie–Bohm theory, nonlocality manifests as the fact that the velocity and acceleration of one particle depends on the instantaneous positions of all other particles. On the other hand, in the theory of relativity the concept of instantaneousness does not have an invariant meaning. Thus, to define particle trajectories, one needs an additional rule that defines which space-time points should be considered instantaneous. The simplest way to achieve this is to introduce a preferred foliation of space-time by hand, such that each hypersurface of the foliation defines a hypersurface of equal time. Initially, it had been considered impossible to set out a description of photon trajectories in the de Broglie–Bohm theory in view of the difficulties of describing bosons relativistically. In 1996,
Partha Ghose presented a relativistic quantum-mechanical description of spin-0 and spin-1 bosons starting from the
Duffin–Kemmer–Petiau equation, setting out Bohmian trajectories for massive bosons and for massless bosons (and therefore
photons). The same year, Ghose worked out Bohmian photon trajectories for specific cases. Subsequent
weak-measurement experiments yielded trajectories that coincide with the predicted trajectories. The significance of these experimental findings is controversial. Chris Dewdney and G. Horton have proposed a relativistically covariant, wave-functional formulation of Bohm's quantum field theory and have extended it to a form that allows the inclusion of gravity. Nikolić has proposed a Lorentz-covariant formulation of the Bohmian interpretation of many-particle wavefunctions. He has developed a generalized relativistic-invariant probabilistic interpretation of quantum theory, in which |\psi|^2 is no longer a probability density in space, but a probability density in space-time. He uses this generalized probabilistic interpretation to formulate a relativistic-covariant version of de Broglie–Bohm theory without introducing a preferred foliation of space-time. His work also covers the extension of the Bohmian interpretation to a quantization of fields and strings. Roderick I. Sutherland at the University in Sydney has a Lagrangian formalism for the pilot wave and its
beables. It draws on
Yakir Aharonov's retrocasual weak measurements to explain many-particle entanglement in a special relativistic way without the need for configuration space. The basic idea was already published by
Olivier Costa de Beauregard in the 1950s and is also used by
John Cramer in his transactional interpretation except the beables that exist between the von Neumann strong projection operator measurements. Sutherland's Lagrangian includes two-way action-reaction between pilot wave and beables. Therefore, it is a post-quantum non-statistical theory with final boundary conditions that violate the no-signal theorems of quantum theory. Just as special relativity is a limiting case of general relativity when the spacetime curvature vanishes, so, too is statistical no-entanglement signaling quantum theory with the Born rule a limiting case of the post-quantum action-reaction Lagrangian when the reaction is set to zero and the final boundary condition is integrated out.
Spin To incorporate
spin, the wavefunction becomes complex-vector-valued. The value space is called spin space; for a
spin-1/2 particle, spin space can be taken to be \Complex^2. The guiding equation is modified by taking
inner products in spin space to reduce the complex vectors to complex numbers. The Schrödinger equation is modified by adding a
Pauli spin term: \begin{align} \frac{d\mathbf{Q}_k}{dt}(t) &= \frac{\hbar}{m_k} \operatorname{Im}\left(\frac{(\psi,D_k \psi)}{(\psi,\psi)}\right)(\mathbf{Q}_1, \ldots, \mathbf{Q}_N, t), \\ i\hbar\frac{\partial}{\partial t}\psi &= \left(-\sum_{k=1}^{N}\frac{\hbar^2}{2m_k}D_k^2 + V - \sum_{k=1}^{N} \mu_k \frac{\mathbf{S}_k}{\hbar s_k} \cdot \mathbf{B}(\mathbf{q}_k)\right) \psi, \end{align} where • m_k, e_k,\mu_k — the mass, charge and
magnetic moment of the k–th particle • \mathbf{S}_k — the appropriate
spin operator acting in the k–th particle's spin space • s_k —
spin quantum number of the k–th particle (s_k = 1/2 for electron) • \mathbf{A} is
vector potential in \R^{3} • \mathbf{B}=\nabla\times\mathbf{A} is the
magnetic field in \R^{3} • D_k = \nabla_k - \frac{ie_k}{\hbar}\mathbf{A}(\mathbf{q}_k) is the covariant derivative, involving the vector potential, ascribed to the coordinates of k–th particle (in
SI units) • \psi — the wavefunction defined on the multidimensional configuration space; e.g. a system consisting of two spin-1/2 particles and one spin-1 particle has a wavefunction of the form \psi: \R^9 \times \R \to \Complex^2 \otimes \Complex^2 \otimes \Complex^3, where \otimes is a
tensor product, so this spin space is 12-dimensional • (\cdot,\cdot) is the
inner product in spin space \Complex^d: (\phi, \psi) = \sum_{s=1}^d \phi_s^* \psi_s.
Stochastic electrodynamics Stochastic electrodynamics (SED) is an extension of the de Broglie–Bohm interpretation of
quantum mechanics, with the electromagnetic
zero-point field (ZPF) playing a central role as the guiding
pilot-wave. Modern approaches to SED, like those proposed by the group around late
Gerhard Grössing, among others, consider wave and particle-like quantum effects as well-coordinated emergent systems. These emergent systems are the result of speculated and calculated sub-quantum interactions with the zero-point field.
Quantum field theory In Dürr et al., the authors describe an extension of de Broglie–Bohm theory for handling
creation and annihilation operators, which they refer to as "Bell-type quantum field theories". The basic idea is that configuration space becomes the (disjoint) space of all possible configurations of any number of particles. For part of the time, the system evolves deterministically under the guiding equation with a fixed number of particles. But under a
stochastic process, particles may be created and annihilated. The distribution of creation events is dictated by the wavefunction. The wavefunction itself is evolving at all times over the full multi-particle configuration space. Hrvoje Nikolić introduces a purely deterministic de Broglie–Bohm theory of particle creation and destruction, according to which particle trajectories are continuous, but particle detectors behave as if particles have been created or destroyed even when a true creation or destruction of particles does not take place.
Curved space To extend de Broglie–Bohm theory to curved space (
Riemannian manifolds in mathematical parlance), one simply notes that all of the elements of these equations make sense, such as
gradients and
Laplacians. Thus, we use equations that have the same form as above. Topological and
boundary conditions may apply in supplementing the evolution of the Schrödinger equation. For a de Broglie–Bohm theory on curved space with spin, the spin space becomes a
vector bundle over configuration space, and the potential in the Schrödinger equation becomes a local self-adjoint operator acting on that space. The field equations for the de Broglie–Bohm theory in the relativistic case with spin can also be given for curved space-times with torsion. In a general spacetime with curvature and torsion, the guiding equation for the
four-velocity u^i of an elementary
fermion particle isu^i=\frac{e^i_\mu \bar{\psi}\gamma^\mu \psi}{\bar{\psi}\psi}, where the wave function \psi is a
spinor, \bar{\psi} is the corresponding
adjoint, \gamma^\mu are the
Dirac matrices, and e^i_\mu is a
tetrad. If the wave function propagates according to the
curved Dirac equation, then the particle moves according to the
Mathisson-Papapetrou equations of motion, which are an extension of the
geodesic equation. This relativistic wave-particle duality follows from the
conservation laws for the
spin tensor and
energy-momentum tensor,
Exploiting nonlocality in a lecture about the De Broglie–Bohm theory. Valentini argues quantum theory is a special equilibrium case of a wider physics and that it may be possible to observe and exploit
quantum non-equilibrium De Broglie and Bohm's causal interpretation of quantum mechanics was later extended by Bohm, Vigier, Hiley, Valentini and others to include stochastic properties. Bohm and other physicists, including Valentini, view the Born rule linking R to the
probability density function \rho = R^2 as representing not a basic law, but a result of a system having reached
quantum equilibrium during the course of the time development under the
Schrödinger equation. It can be shown that, once an equilibrium has been reached, the system remains in such equilibrium over the course of its further evolution: this follows from the
continuity equation associated with the Schrödinger evolution of \psi. It is less straightforward to demonstrate whether and how such an equilibrium is reached in the first place.
Antony Valentini has extended de Broglie–Bohm theory to include signal nonlocality that would allow entanglement to be used as a stand-alone communication channel without a secondary classical "key" signal to "unlock" the message encoded in the entanglement. This violates orthodox quantum theory but has the virtue of making the parallel universes of the
chaotic inflation theory observable in principle. Unlike de Broglie–Bohm theory, Valentini's theory the wavefunction evolution also depends on the ontological variables. This introduces an instability, a feedback loop that pushes the hidden variables out of "sub-quantal heat death". The resulting theory becomes nonlinear and non-unitary. Valentini argues that the laws of quantum mechanics are
emergent and form a "quantum equilibrium" that is analogous to thermal equilibrium in classical dynamics, such that other "
quantum non-equilibrium" distributions may in principle be observed and exploited, for which the statistical predictions of quantum theory are violated. It is controversially argued that quantum theory is merely a special case of a much wider nonlinear physics, a physics in which non-local (
superluminal) signalling is possible, and in which the uncertainty principle can be violated.
Three wave hypothesis More complex variants of this type of approach have appeared, for instance the
three wave hypothesis of
Ryszard Horodecki as well as other complicated combinations of de Broglie and Compton waves. To date there is no evidence that these are useful. == Results ==