Andre A. Marinho, Francisco A. Brito, Carlos Chesman
Published 2014-03-02, updated 2014-06-09Version 2
We address the issue of the Landau diamagnetism problem via $q$-deformed algebra of Fibonacci oscillators through its generalized sequence of two real and independent deformation parameters $q_1$ and $q_2$. We obtain $q$-deformed thermodynamic quantities such as internal energy, number of particles, magnetization and magnetic susceptibility which recover their usual form in the degenerate limit $q_1^2 + q_2^2$=1.
Comments: Latex, 11 pages, two figures, version to appear in Physica A
Intermediate statistics in the Landau diamagnetism problem
Hermite polynomials and Fibonacci Oscillators
Application of Fibonacci oscillators in the Debye model
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