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• ID : Q847019

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• [{'LOWER': 'nuclear'}, {'LOWER': 'magnetic'}, {'LOWER': 'resonance'}, {'LOWER': 'quantum'}, {'LEMMA': 'computer'}]
• [{'LEMMA': 'nmrqc'}]
• [{'LOWER': 'nuclear'}, {'LOWER': 'magnetic'}, {'LOWER': 'resonance'}, {'LOWER': 'quantum'}, {'LEMMA': 'computer'}]

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1. The quantum states are probed through the nuclear magnetic resonances, allowing the system to be implemented as a variation of nuclear magnetic resonance spectroscopy.^[1]
2. NMR differs from other implementations of quantum computers in that it uses an ensemble of systems, in this case molecules, rather than a single pure state.^[1]
3. Initially the approach was to use the spin properties of atoms of particular molecules in a liquid sample as qubits - this is known as liquid state NMR (LSNMR).^[1]
4. This approach has since been superseded by solid state NMR (SSNMR) as a means of quantum computation.^[1]
5. NMR systems have been well studied for over 50 years now.^[2]
6. We will focus on liquid state solution NMR techniques.^[2]
7. How does this NMR Quantum Computer look like?^[2]
8. In their Research Article, Gershenfeld and Chuang (2) propose the use of a much less exotic system—nuclear magnetic resonance (NMR) of molecules in a room-temperature solution.^[3]
9. Of course, solution NMR was used in the 1950s to study equally small molecules, yet today we study proteins with thousands of spins.^[3]
10. If an NMR quantum computer were ultimately scalable to larger numbers of qubits (say 100), the implications for computational science would be exciting.^[3]
11. There is doubt, however, that solution NMR quantum computing will ever be useful.^[3]
12. The result is a novel NMR computer that can be programmed much like a QC, but in other respects more closely resembles a DNA computer.^[4]
13. Most notably, when applied to intractable combinatorial problems, an NMR computer can use an amount of sample, rather than time, which grows exponentially with the size of the problem.^[4]
14. In this paper, we consider another physical mechanism that is capable of computation, namely NMR spectroscopy.^[4]
15. Other researchers have proposed implementing an atomic-scale QC by NMR and analogous physical mechanisms (e.g., refs.^[4]
16. A few years ago, it was found that nuclear magnetic resonance, or NMR, spectroscopy provides a means of combining many of the best features of DNA and quantum computing.^[5]
17. Following the common practice in NMR spectroscopy, we shall now use the word "spin" to refer to an ensemble of chemically equivalent single spins, each in a different molecule of the sample.^[5]
18. This is known in NMR as the INEPT pulse sequence.^[5]
19. Via Fourier transform techniques, an NMR implementation of an ensemble quantum computer is also able to simultaneously measure many expectation values in the single spectrum.^[5]
20. Quantum-assisted NMR spectroscopy checked all the boxes since the readings, called a spectrogram, are put together by measuring a complex set of quantum spins.^[6]
21. The NMR machine reads those spins as different signatures.^[6]
22. We use seven spin-1/2 nuclei in a molecule as quantum bits11,12, which can be manipulated with room temperature liquid-state nuclear magnetic resonance techniques.^[7]
23. A proof of principle for the algorithm for two qubits is provided using a liquid state NMR quantum computer.^[8]
24. The simulation of pattern recognition conducted by the CT researchers was evaluated with a nuclear magnetic resonance spectrometer (NMR) at the TU München.^[8]
25. We point out that some molecules solved in isotropic liquid are well isolated and thus they can also be employed for studying open systems in Nuclear Magnetic Resonance (NMR) experiments.^[9]
26. Crossover from Markovian to non-Markovian relaxation was realized in one NMR experiment, while relaxation like phenomena were observed in approximately isolated systems in the other.^[9]
27. We demonstrate the implementation of several quantum logic gates through one- and two-dimensional NMR methods, using transition- and spin-selective pulses.^[10]
28. Finally, we discuss the implementation of the Deutsch–Jozsa algorithm using NMR.^[10]
29. NMR has an unusual place among the prospective approaches for manipulating quantum information.^[11]
30. In NMR quantum computation, qubits are stored in the orientation of nuclear spins, which have very long coherence times.^[11]
31. The most distinctive feature of NMR quantum computing is that a qubit is stored, not in a single underlying degree of freedom, but in about 1022 redundant copies.^[11]
32. Since the Zeeman splitting between nuclear spin states is a tiny fraction of the thermal energy in room-temperature NMR systems, the quantum state of the spins is very highly mixed.^[11]
33. The solid-state NMR quantum computer, which employs nuclear spins in solids (mainly semiconductors) as quantum bits (qubits), is among the most promising schemes for scalable quantum computers.^[12]
34. This discovery is expected to help advance the progress in research and development of solid-state NMR quantum computers.^[12]
35. Some methods which are currently being explored for implementing quantum computation are ion traps, quantum dots, cavity quantum electrodynamics, and NMR (nuclear Magnetic resonance).^[13]
36. Our group, under the direction of Dr. Isaac Chuang, is focusing on the technique of NMR Quantum Computation.^[13]
37. These electrons can then be used to transfer their polarization to the nuclei of xenon to test the NMR signal.^[13]
38. Eventually the xenon polarization will be transferred to the molecules used to perform NMR quantum computations.^[13]
39. Multiple quantum (MQ) NMR is an effective tool for the generation of a large cluster of correlated particles, which, in turn, represent a basis for quantum information processing devices.^[14]
40. The interplay of MQ NMR spin dynamics and the dimensionality of the space embedding the spins has been probed in materials with quasi-one-dimensional distributions of spins by Yesinowksi et al.^[14]
41. This model is the first exactly solvable model in MQ NMR for a system with a macroscopic number of coupled spins.^[14]
42. The theoretical description of MQ NMR dynamics is a very difficult task because this is a many-spin and MQ problem.^[14]

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