TY - BOOK
ID - 44843
TI - Quantum Information and Foundations
AU - D'Ariano, Giacomo Mauro
AU - Perinotti, Paolo
PB - MDPI - Multidisciplinary Digital Publishing Institute
PY - 2020
KW - reconstruction of quantum theory
KW - entanglement
KW - monogamy
KW - quantum non-locality
KW - conserved informational charges
KW - limited information
KW - complementarity
KW - characterization of unitary group and state spaces
KW - algebraic quantum theory
KW - C*-algebra
KW - gelfand duality
KW - classical context
KW - bohrification
KW - process theory
KW - classical limit
KW - purity
KW - higher-order interference
KW - generalised probabilistic theories
KW - Euclidean Jordan algebras
KW - Pauli exclusion principle
KW - quantum foundations
KW - X-ray spectroscopy
KW - underground experiment
KW - silicon drift detector
KW - measurement uncertainty relations
KW - relative entropy
KW - position
KW - momentum
KW - quantum mechanics
KW - the measurement problem
KW - collapse models
KW - X-rays
KW - quantum gravity
KW - discrete spacetime
KW - causal sets
KW - path summation
KW - entropic gravity
KW - physical computing models
KW - complexity classes
KW - causality
KW - blind source separation (BSS)
KW - qubit pair
KW - exchange coupling
KW - entangled pure state
KW - unentanglement criterion
KW - probabilities in quantum measurements
KW - independence of random quantum sources
KW - iterant
KW - Clifford algebra
KW - matrix algebra
KW - braid group
KW - Fermion
KW - Dirac equation
KW - quantum information
KW - quantum computation
KW - semiclassical physics
KW - quantum control
KW - quantum genetic algorithm
KW - sampling-based learning control (SLC)
KW - quantum foundations
KW - relativity
KW - quantum gravity
KW - cluster states
KW - multipartite entanglement
KW - percolation
KW - Shannon information
KW - quantum information
KW - quantum measurements
KW - consistent histories
KW - incompatible frameworks
KW - single framework rule
KW - probability theory
KW - entropy
KW - quantum relative entropy
KW - quantum information
KW - quantum mechanics
KW - inference
KW - quantum measurement
KW - quantum estimation
KW - macroscopic quantum measurement
KW - quantum annealing
KW - adiabatic quantum computing
KW - hard problems
KW - Hadamard matrix
KW - binary optimization
KW - reconstruction of quantum mechanics
KW - conjugate systems
KW - Jordan algebras
KW - quantum correlations
KW - Gaussian states
KW - Gaussian unitary operations
KW - continuous-variable systems
KW - Wigner-friend experiment
KW - no-go theorem
KW - quantum foundations
KW - interpretations of quantum mechanics
KW - subsystem
KW - agent
KW - conservation of information
KW - purification
KW - group representations
KW - commuting subalgebras
KW - quantum walks
KW - Hubbard model
KW - Thirring model
KW - quantum information
KW - quantum foundations
KW - quantum theory and gravity
SN - 9783039283804 9783039283811
AB - Quantum information has dramatically changed information science and technology, looking at the quantum nature of the information carrier as a resource for building new information protocols, designing radically new communication and computation algorithms, and ultra-sensitive measurements in metrology, with a wealth of applications. From a fundamental perspective, this new discipline has led us to regard quantum theory itself as a special theory of information, and has opened routes for exploring solutions to the tension with general relativity, based, for example, on the holographic principle, on non-causal variations of the theory, or else on the powerful algorithm of the quantum cellular automaton, which has revealed new routes for exploring quantum fields theory, both as a new microscopic mechanism on the fundamental side, and as a tool for efficient physical quantum simulations for practical purposes. In this golden age of foundations, an astonishing number of new ideas, frameworks, and results, spawned by the quantum information theory experience, have revolutionized the way we think about the subject, with a new research community emerging worldwide, including scientists from computer science and mathematics.
ER -