Keith S. M. Lee scite author profile

Quantum field theory reconciles quantum mechanics and special relativity, and plays a central role in many areas of physics. We developed a quantum algorithm to compute relativistic scattering probabilities in a massive quantum field theory with quartic self-interactions (φ(4) theory) in spacetime of four and fewer dimensions. Its run time is polynomial in the number of particles, their energy, and the desired precision, and applies at both weak and strong coupling. In the strong-coupling and high-precision regimes, our quantum algorithm achieves exponential speedup over the fastest known classical algorithm.

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Quantum Computation of Scattering in Scalar Quantum Field Theories

Jordan¹,

Lee²,

Preskill³

2011

Preprint

158

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Quantum field theory provides the framework for the most fundamental physical theories to be confirmed experimentally and has enabled predictions of unprecedented precision. However, calculations of physical observables often require great computational complexity and can generally be performed only when the interaction strength is weak. A full understanding of the foundations and rich consequences of quantum field theory remains an outstanding challenge. We develop a quantum algorithm to compute relativistic scattering amplitudes in massive φ 4 theory in spacetime of four and fewer dimensions. The algorithm runs in a time that is polynomial in the number of particles, their energy, and the desired precision, and applies at both weak and strong coupling. Thus, it offers exponential speedup over existing classical methods at high precision or strong coupling.

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Factorization for power corrections to and

2005

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We derive factorization theorems for Λ QCD /m b power corrections to inclusive B-decays in the endpoint region, where m 2 X ∼ m b Λ QCD . In B → X u ℓν our results are for the full triply differential rate. A complete enumeration of Λ QCD /m b corrections is given. We point out the presence of new Λ QCD /m b -suppressed shape functions, which arise at tree level with a 4π-enhanced coefficient, and show that these previously neglected terms induce an additional significant uncertainty for current inclusive methods of measuring |V ub | that depend on the endpoint region of phase space.

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Quantum computation of scattering in scalar quantum field theories

Jordan

Lee

Preskill

2014

QIC

111

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Quantum field theory provides the framework for the most fundamental physical theories to be confirmed experimentally and has enabled predictions of unprecedented precision. However, calculations of physical observables often require great computational complexity and can generally be performed only when the interaction strength is weak. A full understanding of the foundations and rich consequences of quantum field theory remains an outstanding challenge. We develop a quantum algorithm to compute relativistic scattering amplitudes in massive $\phi^4$ theory in spacetime of four and fewer dimensions. The algorithm runs in a time that is polynomial in the number of particles, their energy, and the desired precision, and applies at both weak and strong coupling. Thus, it offers exponential speedup over existing classical methods at high precision or strong coupling.

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Extracting short distance information fromb→sℓ+ℓ−effectively

et al. 2007

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We point out that in inclusive B → Xsℓ + ℓ − decay an angular decomposition provides a third (q 2 dependent) observable sensitive to a different combination of Wilson coefficients than the rate and the forward-backward asymmetry. Since a precise measurement of q 2 dependence requires large data sets, it is important to consider the data integrated over regions of q 2 . We develop a strategy to extract all measurable Wilson coefficients in B → Xsℓ + ℓ − from a few simple integrated rates in the low q 2 region. A similar decomposition in B → K * ℓ + ℓ − , together with the B → K * γ rate, also provides a determination of the Wilson coefficients, without reliance on form factor models and without having to measure the zero of the forward-backward asymmetry.

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Keith S. M. Lee

Quantum Algorithms for Quantum Field Theories

Quantum Computation of Scattering in Scalar Quantum Field Theories

Factorization for power corrections to and

Quantum computation of scattering in scalar quantum field theories

Extracting short distance information fromb→sℓ+ℓ−effectively

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