Beginning with the Everett-DeWitt many-worlds interpretation of quantum mechanics, there have been a series of proposals for how the state vector of a quantum system might split at any instant into orthogonal branches, each of which exhibits approximately classical behavior. Here we propose a decomposition of a state vector into branches by finding the minimum of a measure of the mean squared quantum complexity of the branches in the branch decomposition. In a non-relativistic formulation of this proposal, branching occurs repeatedly over time, with each branch splitting successively into further sub-branches among which the branch followed by the real world is chosen randomly according to the Born rule. In a Lorentz covariant version, the ...
In this paper, we analyze the circuit complexity for preparing ground states of quantum many-body sy...
For a quantum system undergoing non-Markovian open quantum dynamics, we demonstrate a tomography alg...
We consider how to define a natural probability distribution over worlds within a simple class of de...
We propose a measure of quantum state complexity defined by minimizing the spread of the wave-functi...
The complexity classes defined on the basis of branching programs are considered. Some basic relatio...
We propose a definition of wavefunction "branchings": quantum superpositions which can't be feasibly...
We use complexity theory to rigorously investigate the difficulty of classically simulating evolutio...
While we have intuitive notions of structure and complexity, the formalization of this intuition is ...
We address the difference between integrable and chaotic motion in quantum theory as manifested by t...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
We establish bounds on quantum correlations in many-body systems. They reveal what sort of informati...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...
Chaotic systems are highly sensitive to a small perturbation, be they biological, chemical, classica...
As a new step towards defining complexity for quantum field theories, we map Nielsen operator comple...
Any computation is facilitated by some physical process, and the observable quantities of any physic...
In this paper, we analyze the circuit complexity for preparing ground states of quantum many-body sy...
For a quantum system undergoing non-Markovian open quantum dynamics, we demonstrate a tomography alg...
We consider how to define a natural probability distribution over worlds within a simple class of de...
We propose a measure of quantum state complexity defined by minimizing the spread of the wave-functi...
The complexity classes defined on the basis of branching programs are considered. Some basic relatio...
We propose a definition of wavefunction "branchings": quantum superpositions which can't be feasibly...
We use complexity theory to rigorously investigate the difficulty of classically simulating evolutio...
While we have intuitive notions of structure and complexity, the formalization of this intuition is ...
We address the difference between integrable and chaotic motion in quantum theory as manifested by t...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
We establish bounds on quantum correlations in many-body systems. They reveal what sort of informati...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...
Chaotic systems are highly sensitive to a small perturbation, be they biological, chemical, classica...
As a new step towards defining complexity for quantum field theories, we map Nielsen operator comple...
Any computation is facilitated by some physical process, and the observable quantities of any physic...
In this paper, we analyze the circuit complexity for preparing ground states of quantum many-body sy...
For a quantum system undergoing non-Markovian open quantum dynamics, we demonstrate a tomography alg...
We consider how to define a natural probability distribution over worlds within a simple class of de...