Abstract
We statistically deal with two distinct quantum interactions embedded within an exactly solvable model that mimics some well known nuclear effects. By recourse to finite temperature statistical quantifiers we describe how these two fermion–fermion interactions compete and strongly influence each other. Statistically scrutinizing such competition leads to interesting insights on many body dynamics’ features. We discuss, in particular, the thermal efficiency of the fermion–fermion interactions
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Cervia MJ et al. Lipkin model on a quantum computer. arXiv:2011.04097
Lipkin HJ, Meshkov N, Glick AJ (1965) Validity of many-body approximation methods for a solvable model: (I). Exact solutions and perturbation theory. Nucl Phys 62:188
Lerma HS, Dukelsky J (2014) The Lipkin-Meshkov-Glick model from the perspective of the SU(1,1) Richardson-Gaudin models. J Phys: Conf Ser 492:012013
Providencia C, da Providencia J, Tsue Y, Yamamura M The Lipkin Model in Many-Fermion system as an example of the su(1,1) times su(1,1)-algebraic model. arXiv:nucl-th$/$0604023
Di Tullio M, Rossignoli R, Cerezo M, Gigena N (2019) Fermionic entanglement in the Lipkin model. Phys Rev 100:062104
Nolting W (2009) Fundamentals of many-body physics. Springer-Verlag, Berlin
Cambiaggio MC, Plastino A (1978) Quasi spin pairing and the structure of the Lipkin Model. Z Physik A 288:153
Pennini F, Plastino A (2018) Complexity and disequilibrium as telltales of superconductivity. Phys A 506:828
Plastino AR, Ferri GL, Plastino A (2021) Interaction between different kinds of quantum phase transitions. Quantum Rep 3:253
Ring P, Schuck P (1980) The nuclear many-body problem. Springer, Berlin
de Llano M, Tolmachev VV (2003) Multiple phases in a new statistical boson fermion model of superconductivity. Phys A 317:546
Uys H, Miller HG, Khanna FC (2001) Generalized statistics and high-\(T_c\) superconductivity. Phys Lett A 289:264
Plastino Angelo, Ferri Gustavo Luis, Plastino AR (2021) Spectral explanation for statistical odd-even staggering in few fermions systems. Quantum Rep 3:166–172
Plastino A, Moszkowski SM (1978) Simplified model for illustrating Hartree-Fock in a Lipkin-model problem. Nuovo Cimento 47:470
Rossignoli R, Plastino A (1985) Thermal effects and the interplay between pairing and shape deformations. Phys Rev C 32:1040
López-Ruiz R, Mancini HL, Calbet X (1995) A statistical measure of complexity. Phys Lett A 209:321
López-Ruiz R (2001) Complexity in some physical systems. Int J Bifurc Chaos 11:2669
Martin MT, Plastino A, Rosso OA (2003) Statistical complexity and disequilibrium. Phys Lett A 311:126
Rudnicki L, Toranzo IV, Sánchez-Moreno P, Dehesa JS (2016) Monotone measures of statistical complexity. Phys Lett A 380:377
López-Ruiz R, Mancini H, Calbet X (2013) A Statistical Measure of Complexity in Concepts and recent advances in generalized information measures and statistics. In: Kowalski A, Rossignoli R, Curado EMC (eds) Bentham science books. pp 147–168, A. Kowalski, New York
Sen KD (ed) (2011) Statistical complexity. Applications in electronic structure. Springer, Berlin
Martin MT, Plastino A, Rosso OA (2006) Physica A. Generalized statistical complexity measures: geometrical and analytical properties 369:439
Pennnini F, Plastino A (2017) Disequilibrium, thermodynamic relations, and Rnyis entropy. Phys Lett A 381:212
Nigmatullin Ramil, Prokopenko Mikhail (2021) Thermodynamic efficiency of interactions in self-organizing systems. Entropy 23:757
Author information
Authors and Affiliations
Corresponding author
Additional information
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Plastino, A., Plastino, A.R. & Ferri, G.L. Statistical Thermal Efficiency and Quantum Interactions. J Indian Inst Sci 102, 1259–1267 (2022). https://doi.org/10.1007/s41745-022-00294-0
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s41745-022-00294-0