Hybrid quantum-classical model of quantum measurements

Abstract: Two types of Hamiltonian hybrid quantum-classical theories are considered as potential models ofthe quantum measurement process. The two theories have the same Hamiltonian dynamics but differ in the association of states of the quantum system with states of the hybrid model. In the first type of association pure quantum states are modeled by pure states of the hybrid, while in the second type the pure quantum states are modeled by statistical mixtures of the hybrid pure states. It is shown that the second of t… Show more

“…In all these approaches one starts with initially separated purely classical and quantum sectors and then makes them interact in order to analyze the outcome. Without pretending to be exhaustive, we can classify these approaches in the following categories: (1) approaches that try to maintain the use of quantum states (or density matrices) to describe the quantum sector and trajectories for the classical sector [4,5], (2) those that first formulate the classical sector as a quantum theory [6,7,8] and then work with a formally completely quantum system [9,10,11,12,13,14,15,16,17], (3) conversely, those that first formulate the quantum sector as a classical theory [18] and then work with a formally completely classical system [19,20,21,22], and (4) approaches that take the quantum and the classical sectors to a common language and then extend it to a single framework in the presence of interactions, for instance, using Hamilton-Jacobi statistical theory for the classical sector and Madelung representation for the quantum sector [23,24,25] or modeling classical and quantum dynamics starting from Ehrenfest equations [26]. This classification is not sharp and in some cases it is subject to interpretation, but it may be useful as a way to organize the possible procedures and conceptual viewpoints in the enterprise of constructing a hybrid theory.…”

“…One can see that the transformations (13) and (15) combine in a way that makes this action invariant under transverse diffeomorphisms (now acting on the field g ab ) as well as Weyl transformations. The action (16) is thus the most general nonlinear covariant action quadratic in the derivatives of the field g ab and satisfying these invariance requisites.…”

“…The second principle rests in the observation that conformal invariance is not a symmetry of matter in our world. A safe way to proceed is then to consider that matter fields are not affected by the Weyl transformations (15) (in the language of [42], matter fields are inert under Weyl transformations). Both principles imply that the resulting action of matter is obtained by replacing η ab with the composite field g ab .…”

Some not-so-common ideas about gravity

“…In all these approaches one starts with initially separated purely classical and quantum sectors and then makes them interact in order to analyze the outcome. Without pretending to be exhaustive, we can classify these approaches in the following categories: (1) approaches that try to maintain the use of quantum states (or density matrices) to describe the quantum sector and trajectories for the classical sector [4,5], (2) those that first formulate the classical sector as a quantum theory [6,7,8] and then work with a formally completely quantum system [9,10,11,12,13,14,15,16,17], (3) conversely, those that first formulate the quantum sector as a classical theory [18] and then work with a formally completely classical system [19,20,21,22], and (4) approaches that take the quantum and the classical sectors to a common language and then extend it to a single framework in the presence of interactions, for instance, using Hamilton-Jacobi statistical theory for the classical sector and Madelung representation for the quantum sector [23,24,25] or modeling classical and quantum dynamics starting from Ehrenfest equations [26]. This classification is not sharp and in some cases it is subject to interpretation, but it may be useful as a way to organize the possible procedures and conceptual viewpoints in the enterprise of constructing a hybrid theory.…”

“…One can see that the transformations (13) and (15) combine in a way that makes this action invariant under transverse diffeomorphisms (now acting on the field g ab ) as well as Weyl transformations. The action (16) is thus the most general nonlinear covariant action quadratic in the derivatives of the field g ab and satisfying these invariance requisites.…”

“…The second principle rests in the observation that conformal invariance is not a symmetry of matter in our world. A safe way to proceed is then to consider that matter fields are not affected by the Weyl transformations (15) (in the language of [42], matter fields are inert under Weyl transformations). Both principles imply that the resulting action of matter is obtained by replacing η ab with the composite field g ab .…”

Some not-so-common ideas about gravity

“…The result is mathematically consistent purely Hamiltonian theory of a hybrid system. However, application of the theory to the measurement situation shows that classical pointer variable is in general coupled to the expectation  of the measured observable and not to its eigenvalues [22,23]. Furthermore, the theory in its exact form predicts some features of QDF which might imply possibility of superluminal communication [24].…”

Phase space theory of quantum–classical systems with nonlinear and stochastic dynamics

“…This possibility arises when there are two different energy or mass scales, as it happens, for instance, in molecular and condensed matter systems where the nuclei are heavy and slow, while the electrons are light and fast. Hybrid models have also been proposed to explain the measurement process [1,2]: the measurement device is modeled as a classical system coupled to the quantum system to be measured. In field theory, hybrid quantum-classical systems have also been considered as candidates to describe quantum matter fields interacting with a (classical) gravitational field, as a semiclassical approximation or even a fundamental theory (see Refs.…”

Entropy and canonical ensemble of hybrid quantum classical systems