Model independent extraction of the proton magnetic radius from electron scattering

Epstein, Zachary; Paz, Gil; Roy, J.

doi:10.1103/physrevd.90.074027

Cited by 62 publications

(68 citation statements)

References 154 publications

(239 reference statements)

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“…For the remaining coefficients, one can motivate bounds, as suggested in Refs. [15,54]. They parameterize the unit circle by z(t) = e iθ(t) and integrate over it.…”

Section: B Conformal Mappings and Related Constraintsmentioning

confidence: 99%

Theoretical constraints and systematic effects in the determination of the proton form factors

et al. 2015

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We calculate the two-photon exchange corrections to electron-proton scattering with nucleon and ∆ intermediate states. The results show a dependence on the elastic nucleon and nucleon-∆-transition form factors used as input which leads to significant changes compared to previous calculations. We discuss the relevance of these corrections and apply them to the most recent and precise data set and world data from electron-proton scattering. Using this, we show how the form factor extraction from these data is influenced by the subsequent inclusion of physical constraints. The determination of the proton charge radius from scattering data is shown to be dominated by the enforcement of a realistic spectral function. Additionally, the third Zemach moment from the resulting form factors is calculated. The obtained radius and Zemach moment are shown to be consistent with Lamb shift measurements in muonic hydrogen.

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“…For the remaining coefficients, one can motivate bounds, as suggested in Refs. [15,54]. They parameterize the unit circle by z(t) = e iθ(t) and integrate over it.…”

Section: B Conformal Mappings and Related Constraintsmentioning

confidence: 99%

Theoretical constraints and systematic effects in the determination of the proton form factors

et al. 2015

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“…Here, we address aspects of the radius extraction from scattering data, the systematics of which have been discussed vigorously in the literature recently [18][19][20][21][22][23][24][25][26][27][28]. Irrespective of the challenges involved in data selection and radiative corrections, the extraction can be stabilized by respecting the analytic structure of the electromagnetic form factors [29], e.g., by employing a conformal expansion.…”

Section: Introductionmentioning

confidence: 99%

On the $\pi\pi$ π π continuum in the nucleon form factors and the proton radius puzzle

Hoferichter

Kubis²,

Elvira³

et al. 2016

Eur. Phys. J. A

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Abstract. We present an improved determination of the ππ continuum contribution to the isovector spectral functions of the nucleon electromagnetic form factors. Our analysis includes the most up-to-date results for the ππ →N N partial waves extracted from Roy-Steiner equations, consistent input for the pion vector form factor, and a thorough discussion of isospin-violating effects and uncertainty estimates. As an application, we consider the ππ contribution to the isovector electric and magnetic radii by means of sum rules, which, in combination with the accurately known neutron electric radius, are found to slightly prefer a small proton charge radius.

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“…The operator definition identifying R(µ) as a ratio of Wilson loop matrix elements in n f = 1 and n f = 0 can be used to show that log R(µ) contains only a single power of the large logarithm, log(Q 2 /m 2 ), to all orders in perturbation theory [16]. 9 This ensures that high powers of large logarithms do not upset the power counting of the resummed perturbative expansion. (45) and (30), and the soft contribution to 9 In particular, d log R(µ)/d log µ is given by the difference of cusp anomalous dimensions with n f = 1 and n f = 0, cf.…”

Section: Factorization Of Jet and Remainder Functionmentioning

confidence: 99%

“…9 This ensures that high powers of large logarithms do not upset the power counting of the resummed perturbative expansion. (45) and (30), and the soft contribution to 9 In particular, d log R(µ)/d log µ is given by the difference of cusp anomalous dimensions with n f = 1 and n f = 0, cf. Eqs.…”

Section: Factorization Of Jet and Remainder Functionmentioning

confidence: 99%

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Effective field theory for large logarithms in radiative corrections to electron proton scattering

Hill

2017

Phys. Rev. D

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Radiative corrections to elastic electron-proton scattering are analyzed in effective field theory.A new factorization formula identifies all sources of large logarithms in the limit of large momentum transfer, Q 2 m 2 e . Explicit matching calculations are performed through two-loop order. A renormalization analysis in soft-collinear effective theory is performed to systematically compute and resum large logarithms. Implications for the extraction of charge radii and other observables from scattering data are discussed. The formalism may be applied to other lepton-nucleon scattering and e + e − annihilation processes.

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Model independent extraction of the proton magnetic radius from electron scattering

Cited by 62 publications

References 154 publications

Theoretical constraints and systematic effects in the determination of the proton form factors

Theoretical constraints and systematic effects in the determination of the proton form factors

On the $\pi\pi$ π π continuum in the nucleon form factors and the proton radius puzzle

Effective field theory for large logarithms in radiative corrections to electron proton scattering

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