Search results for "Hilbert space."

showing 10 items of 227 documents

Fundamental bounds on qubit reset

2020

Qubit reset is a basic prerequisite for operating quantum devices, requiring the export of entropy. The fastest and most accurate way to reset a qubit is obtained by coupling the qubit to an ancilla on demand. Here, we derive fundamental bounds on qubit reset in terms of maximum fidelity and minimum time, assuming control over the qubit and no control over the ancilla. Using the Cartan decomposition of the Lie algebra of qubit plus two-level ancilla, we identify the types of interaction and controls for which the qubit can be purified. For these configurations, we show that a time-optimal protocol consists of purity exchange between qubit and ancilla brought into resonance, where the maximu…

media_common.quotation_subjectFOS: Physical sciencesQuantum controlFidelityTopology53001 natural sciences010305 fluids & plasmassymbols.namesakeComputer Science::Emerging TechnologiesDimension (vector space)0103 physical sciencesQuantum information architectures & platformsQuantum information010306 general physicsQuantum information architectures & platformsmedia_commonPhysicsQuantum Physics500 Naturwissenschaften und Mathematik::530 Physik::530 PhysikHilbert spaceQuantum controlQuantum PhysicsQubitsymbolsQuantum InformationQuantum Physics (quant-ph)Reset (computing)
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The Principles of Quantum Theory

2013

This chapter develops the formal framework of quantum mechanics: the mathematical tools, generalization and abstraction of the notion of state, representation theory, and a first version of the postulates on which quantum theory rests.

medicine.medical_specialtyComputer scienceGeneralizationQuantum dynamicsHilbert spaceRelationship between string theory and quantum field theoryAbstraction (mathematics)symbols.namesakeOpen quantum systemQuantum stateQuantum mechanicssymbolsQuantum nanosciencemedicine
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Experimental Engineering of Arbitrary Qudit States with Discrete-Time Quantum Walks

2019

The capability to generate and manipulate quantum states in high-dimensional Hilbert spaces is a crucial step for the development of quantum technologies, from quantum communication to quantum computation. One-dimensional quantum walk dynamics represents a valid tool in the task of engineering arbitrary quantum states. Here we affirm such potential in a linear-optics platform that realizes discrete-time quantum walks in the orbital angular momentum degree of freedom of photons. Different classes of relevant qudit states in a six-dimensional space are prepared and measured, confirming the feasibility of the protocol. Our results represent a further investigation of quantum walk dynamics in p…

qudit statesPhotonLightComputer scienceFOS: Physical sciencesGeneral Physics and Astronomy01 natural sciencesSettore FIS/03 - Fisica Della MateriaDegrees of freedom (mechanics)symbols.namesakeQuantum statequantum information0103 physical sciencesquantum walksphotonsQuantum walkStatistical physics010306 general physicsQuantum information scienceQuantumQuantum computerQuantum PhysicsQuantum opticsHilbert spacequatum walks; qudit states; photonsQuantum computersQuantum technologysymbolsQuantum Physics (quant-ph)quatum walks
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Operators in Rigged Hilbert Spaces, Gel’fand Bases and Generalized Eigenvalues

2022

Given a self-adjoint operator A in a Hilbert space H, we analyze its spectral behavior when it is expressed in terms of generalized eigenvectors. Using the formalism of Gel’fand distribution bases, we explore the conditions for the generalized eigenspaces to be one-dimensional, i.e., for A to have a simple spectrum.

rigged Hilbert space; generalized eigenvectors; simple spectrumrigged Hilbert spaceSettore MAT/05 - Analisi MatematicaGeneral Mathematicsgeneralized eigenvectorComputer Science (miscellaneous)simple spectrumEngineering (miscellaneous)Settore MAT/07 - Fisica MatematicaMathematics; Volume 11; Issue 1; Pages: 195
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Representing compact sets of compact operators and of compact range vector measures

1987

symbols.namesakeApproximation propertyNuclear operatorGeneral MathematicsHilbert spacesymbolsFinite-rank operatorCompact operatorTopologyInvariant subspace problemContinuous functions on a compact Hausdorff spaceCompact operator on Hilbert spaceMathematicsArchiv der Mathematik
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On the asymptotic behaviour of gaussian spherical integrals

1983

symbols.namesakeAsymptotic analysisSlater integralsGaussianMathematical analysissymbolsAsymptotic expansionGaussian measureSeparable hilbert spaceMathematicsGaussian random field
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Gaussian plane and spherical means in separable Hilbert spaces

1982

symbols.namesakeHilbert manifoldCovariance operatorHilbert R-treePlane (geometry)GaussianRadon measureMathematical analysisHilbert spacesymbolsMathematicsSeparable space
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Operator (Quasi-)Similarity, Quasi-Hermitian Operators and All that

2016

Motivated by the recent developments of pseudo-Hermitian quantum mechanics, we analyze the structure generated by unbounded metric operators in a Hilbert space. To that effect, we consider the notions of similarity and quasi-similarity between operators and explore to what extent they preserve spectral properties. Then we study quasi-Hermitian operators, bounded or not, that is, operators that are quasi-similar to their adjoint and we discuss their application in pseudo-Hermitian quantum mechanics. Finally, we extend the analysis to operators in a partial inner product space (pip-space), in particular the scale of Hilbert space s generated by a single unbounded metric operator.

symbols.namesakeInner product spacePure mathematicsSimilarity (geometry)Operator (computer programming)Bounded functionMetric (mathematics)Hilbert spacesymbolsUnitary operatorHermitian matrix
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Liftings and extensions of operators in Brownian setting

2020

We investigate the operators T on a Hilbert space H which have 2-isometric liftings S with the property S ∗ S H ⊂ H . We show that such liftings are closely related to some extensions of T, which h...

symbols.namesakePure mathematicsAlgebra and Number TheoryProperty (philosophy)Mathematics::Operator AlgebrasHilbert spacesymbols010103 numerical & computational mathematicsExtension (predicate logic)0101 mathematics01 natural sciencesBrownian motionMathematicsLinear and Multilinear Algebra
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Partial *-Algebras of Operators in a PIP-Space

2009

The family of operators on a pip-space V is endowed with two, possibly different, partial multiplications, where partial means that the multiplication is not defined for any pair A,B of elements of Op(V) but only for certain couples. The two multiplications, to be called strong and weak, give rise to two different structures that coincide in certain situations. In this chapter we will discuss first the structure of Op(V) as partial *-algebra in the sense of [AIT02] and then the possibility of representing an abstract partial *-algebra into Op(V).

symbols.namesakePure mathematicsComplete latticeHilbert spacesymbolsStructure (category theory)MultiplicationAlgebra over a fieldSpace (mathematics)Dual pairMathematics
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