Superstatistics of the Klein–Gordon equation in deformed formalism for modified Dirac delta distribution

Sargolzaeipor, S.; Hassanabadi, H.; Chung, Won Sang

doi:10.1142/s0217732318500608

Cited by 16 publications

(7 citation statements)

References 20 publications

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“…(12 and 13)). Note here that some recent theoretical developments, in the context of the theory of superstatistics, have used the known formulae of normal statistical mechanics in their investigation on some problems in physics [27][28][29][30][31][32][33]. Their results can be accepted only in the framework of the above arguments about the applicability of the habitual thermodynamics laws in the superstatistics formalism.…”

Section: Generalized Statistical Mechanics For Superstatistical Systemsmentioning

confidence: 99%

Superstatistics of the one-dimensional Klein-Gordon oscillator with energy-dependent potentials

2020

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In this paper, we investigated the influence of energy-dependent potentials on the thermodynamic properties of the Klein-Gordon oscillator(KGO): in this way all thermal properties have been determinate via the well-know Euler-Maclaurin method. After this, we extend our study to the case of superstatistical properties of our problem in question. The probability densityf(β)followsχ2− superstatistics (=Tsallis statistics or Gamma distribution). Under the approximation of the low-energy asymptotics of superstatistics, the partition function, at first, has been calculated. This approximation leads to a universal parameterqfor any superstatistics, not only for Tsallis statistics. By using the desired partition function, all thermal properties have been obtained in terms of the parameterq. Also, the influence of the this type of potentials on these properties, via the parameterγ, are well discussed.

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Section: Generalized Statistical Mechanics For Superstatistical Systemsmentioning

confidence: 99%

Superstatistics of the one-dimensional Klein-Gordon oscillator with energy-dependent potentials

2020

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“…It is commonly believed that this idea is the most effective mathematical method to analyze the relativistic quantum mechanical behavior of the spin-1 2 particles (electron, proton, and their corresponding antiparticles) [2]. Therefore, one can easily see that there are lots of papers where some solutions of the Dirac equation are illustrated in various spacetimes [3][4][5][6][7].…”

Section: Introductionmentioning

confidence: 99%

Dynamics of the Dirac Particle in an Anisotropic Rainbow Universe

Kangal

2022

Cumhuriyet Science Journal

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“…In such scenarios, it is necessary to achieve the correct formalism arXiv:1910.08183v1 [cond-mat.mtrl-sci] 17 Oct 2019 to describe situations out of the thermodynamic equilibrium. Superstatistics (SE) is one of the most attractive tools to describe the non-equilibrium dynamics of complex systems [46][47][48][49][50][51][52][53], given its applications in several fields where the dynamic exhibit inhomogeneous spatiotemporal properties and making necessary an extension of the usual statistical methods. Beck and Cohen [54,55] introduced the SE formalism as a generalization of the Boltzmann-Gibbs factor e −β Ĥ through the assumption of the existence of fluctuations in an intensive parameter β.…”

Section: Introductionmentioning

confidence: 99%

Super-statistical description of thermo-magnetic properties of a system of 2D GaAs quantum dots with gaussian confinement and Rashba spin–orbit interaction

Castaño-Yepes

Amor-Quiroz

2020

Physica A: Statistical Mechanics and its Applications

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We examine the effect of non-equilibrium processes modeled by the introduction of a generalized Boltzmann factor on the thermal and magnetic properties of an array of two-dimensional GaAs quantum dots in the presence of an external uniform and constant magnetic field. The model consists of a single-electron subject to a confining Gaussian potential with a spin-orbit interaction in the Rashba approach. We compute the specific heat and the magnetic susceptibility within the formalism of χ 2 -superstatistics from the exact solution of the Schrödinger equation. Furthermore, an analytic solution for the partition function allows a study of the impact of the number of subsystems on the superstatistical corrections and confirms that the ordinary thermo-magnetic properties are recovered whenever the thermal distribution can be approximated by a Dirac delta. Also, we found a progressive disappearance of the Schottky anomaly with decreasing number of subsystems, while the specific heat ceases to be a monotonically increasing function with respect to the average temperature when the χ 2 -distribution is spread over a large range of temperatures. Remarkably, the introduction of fluctuations in the temperature is found to suppress the paramagnetic phase transition that would otherwise appear at low temperatures. Finally, we emphasize that an appropriate construction of the definition of physical observables is crucial for obtaining a correct description of the physics derived from a non-extensive construction of the entropy.

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Superstatistics of the Klein–Gordon equation in deformed formalism for modified Dirac delta distribution

Cited by 16 publications

References 20 publications

Superstatistics of the one-dimensional Klein-Gordon oscillator with energy-dependent potentials

Superstatistics of the one-dimensional Klein-Gordon oscillator with energy-dependent potentials

Dynamics of the Dirac Particle in an Anisotropic Rainbow Universe

Super-statistical description of thermo-magnetic properties of a system of 2D GaAs quantum dots with gaussian confinement and Rashba spin–orbit interaction

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