Lagrangian for the Frenkel electron

Дериглазов, А. А.

doi:10.1016/j.physletb.2014.07.029

Cited by 29 publications

(34 citation statements)

References 30 publications

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“…Many people mentioned remarkable analogies between gravitation and electromagnetism in various circumstances [16,[25][26][27][28]. Here we observe an analogy, comparing (18)- (20) with equations of motion of spinning particle (with null gyromagnetic ratio) [29] in electromagnetic field with the strength F µν…”

supporting

confidence: 51%

“…In the vector model of spin presented in [29], the configuration space consist of the position of the particle x µ (τ ), and the vector ω µ (τ ) attached to the point x µ (τ ). Minimal interaction with gravity is achieved by direct covariantization of the free action, initially formulated in Minkowski space.…”

Section: Vector Model Of Spin and Mathisson-papapetrou-tulczyjew-mentioning

confidence: 99%

“…of a spinning particle interacting with electromagnetic field through the gyromagnetic ratio g, see [29]. In view of this similarity, the interaction constant κ is called gravimagnetic moment [15,16], and we expect that nonminimally interacting theory with the Hamiltonian (24) could be consistent generalization of MPTD equations.…”

Section: Rotating Body With Gravimagnetic Momentmentioning

confidence: 99%

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Relativistic effects due to gravimagnetic moment of a rotating body

Ramírez

Дериглазов

2017

Phys. Rev. D

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We compute exact Hamiltonian (and corresponding Dirac brackets) for spinning particle with gravimagnetic moment κ in an arbitrary gravitational background. κ = 0 corresponds to the Mathisson-Papapetrou-Tulczyjew-Dixon (MPTD) equations. κ = 1 leads to modified MPTD equations with reasonable behavior in the ultrarelativistic limit. So we study the modified equations in the leading post-Newtonian approximation. Rotating body with unit gravimagnetic moment has qualitatively different behavior as compared with MPTD body: A) If a number of gyroscopes with various rotation axes are freely traveling together, the angles between the axes change with time. B) For specific binary systems, gravimagnetic moment gives a contribution to frame-dragging effect with the magnitude, that turns out to be comparable with that of Schiff frame dragging.

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supporting

confidence: 51%

Section: Vector Model Of Spin and Mathisson-papapetrou-tulczyjew-mentioning

confidence: 99%

Section: Rotating Body With Gravimagnetic Momentmentioning

confidence: 99%

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Relativistic effects due to gravimagnetic moment of a rotating body

Ramírez

Дериглазов

2017

Phys. Rev. D

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“…To introduce an interaction of spin with electromagnetic field, we use [24] the formulation (183) with the auxiliary variable 1 . We add to the action (183) the term (184) and replacė휇…”

Section: Interaction and The Problem Of Covariant Formalismmentioning

confidence: 99%

“…The present review article is based mainly on the recent works [24][25][26][27][28][29][30][31][32][33]. In [24] we constructed final Lagrangian for a spinning particle with an arbitrary magnetic moment.…”

Section: Introductionmentioning

confidence: 99%

Recent Progress on the Description of Relativistic Spin: Vector Model of Spinning Particle and Rotating Body with Gravimagnetic Moment in General Relativity

Дериглазов

Ramírez

2017

Advances in Mathematical Physics

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We review the recent results on development of vector models of spin and apply them to study the influence of spin-field interaction on the trajectory and precession of a spinning particle in external gravitational and electromagnetic fields. The formalism is developed starting from the Lagrangian variational problem, which implies both equations of motion and constraints which should be presented in a model of spinning particle. We present a detailed analysis of the resulting theory and show that it has reasonable properties on both classical and quantum level. We describe a number of applications and show how the vector model clarifies some issues presented in theoretical description of a relativistic spin: (A) one-particle relativistic quantum mechanics with positive energies and its relation with the Dirac equation and with relativistic Zitterbewegung; (B) spin-induced noncommutativity and the problem of covariant formalism; (C) three-dimensional acceleration consistent with coordinate-independence of the speed of light in general relativity and rainbow geometry seen by spinning particle; (D) paradoxical behavior of the Mathisson-PapapetrouTulczyjew-Dixon equations of a rotating body in ultrarelativistic limit, and equations with improved behavior.

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Sketch of Lagrangian Formalism

Дериглазов¹

2016

Classical Mechanics

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Lagrangian for the Frenkel electron

Cited by 29 publications

References 30 publications

Relativistic effects due to gravimagnetic moment of a rotating body

Relativistic effects due to gravimagnetic moment of a rotating body

Recent Progress on the Description of Relativistic Spin: Vector Model of Spinning Particle and Rotating Body with Gravimagnetic Moment in General Relativity

Sketch of Lagrangian Formalism

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