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Quantum error correction
Quantum error correction

Numerical Analysis of Quantum Graphs
Numerical Analysis of Quantum Graphs

Preskill - Microsoft
Preskill - Microsoft

Universal quantum simulation with prethreshold superconducting qubits: Single-excitation subspace method
Universal quantum simulation with prethreshold superconducting qubits: Single-excitation subspace method

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Seeing a single photon without destroying it

Selection rules for nonradiative carrier relaxation processes in
Selection rules for nonradiative carrier relaxation processes in

Quantum Optics VII Conference Program
Quantum Optics VII Conference Program

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The Parallel Development of Matrix and Wave Mechanics

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1 Why do we need position operator in quantum theory?

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Consciousness as a State of Matter

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Full randomness from arbitrarily deterministic events - diss.fu
Full randomness from arbitrarily deterministic events - diss.fu

$doc.title

... The resonance lines are found by calculating the transmission through the quantum dot as function of X` and Xr . One then finds [30] that when either X` or Xr is varied while the other parameter is kept fixed, the maxima of the transmission occur on two ‘resonance lines’, shown in thick lines in Fig ...
An introduction to rigorous formulations of quantum field theory
An introduction to rigorous formulations of quantum field theory

chapter ia brief overview of structural, spectral and
chapter ia brief overview of structural, spectral and

Simulating Space and Time
Simulating Space and Time

... an arbitrary designer if it isn’t, but the dynamic act of processing itself has no such limitation. In this model, nonphysical quantum processing dynamically outputs the physical world as a series of static states. Reality can’t be saved, downloaded or uploaded We save, download and upload static da ...
Spin transport through nanostructures B. K ,
Spin transport through nanostructures B. K ,

Noncommutative geometry and reality
Noncommutative geometry and reality

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Shell Model Approach to Nuclear Reactions

the quantum vacuum
the quantum vacuum

Phys. Rev. B 94, 195305 (2016) - Petta Group
Phys. Rev. B 94, 195305 (2016) - Petta Group

... coherence times T2 = 60 ms have been reported [3]. Isotopic enrichment has extended the quantum coherence time to T2 = 10 s [4]. Moreover, the ability to dope silicon with a wide range of donors and acceptors is particularly exciting, as heavy elements such as 209 Bi (with nuclear spin quantum numbe ...
An Introduction to Quantum Game Theory
An Introduction to Quantum Game Theory

Supersymmetric quantum mechanics and new potentials
Supersymmetric quantum mechanics and new potentials

Iterative quantum-state transfer along a chain of nuclear spin qubits
Iterative quantum-state transfer along a chain of nuclear spin qubits

Slide 1
Slide 1

... Radiological interpretations? Sometimes… Spectroscopy? Absolutely… Spectroscopic imaging? Yes indeed… X-nuclei? Why not! ...
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Quantum group

In mathematics and theoretical physics, the term quantum group denotes various kinds of noncommutative algebra with additional structure. In general, a quantum group is some kind of Hopf algebra. There is no single, all-encompassing definition, but instead a family of broadly similar objects.The term ""quantum group"" first appeared in the theory of quantum integrable systems, which was then formalized by Vladimir Drinfeld and Michio Jimbo as a particular class of Hopf algebra. The same term is also used for other Hopf algebras that deform or are close to classical Lie groups or Lie algebras, such as a `bicrossproduct' class of quantum groups introduced by Shahn Majid a little after the work of Drinfeld and Jimbo.In Drinfeld's approach, quantum groups arise as Hopf algebras depending on an auxiliary parameter q or h, which become universal enveloping algebras of a certain Lie algebra, frequently semisimple or affine, when q = 1 or h = 0. Closely related are certain dual objects, also Hopf algebras and also called quantum groups, deforming the algebra of functions on the corresponding semisimple algebraic group or a compact Lie group.Just as groups often appear as symmetries, quantum groups act on many other mathematical objects and it has become fashionable to introduce the adjective quantum in such cases; for example there are quantum planes and quantum Grassmannians.
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