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Abstract:In this work we study the diamagnetic properties of a perfect quantum gas in the presence of a constant magnetic field of intensity B. We investigate the Gibbs semigroup associated to the one particle operator at finite volume, and study its Taylor series with respect to the field parameter ω := eB/c in different topologies. This allows us to prove the existence of the thermodynamic limit for the pressure and for all its derivatives with respect to ω (the so-called generalized susceptibilities).MSC 2000: 82B10, 82B21, 81V99

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Diamagnetic expansions for perfect quantum gases II: Uniform bounds

Briet

Cornean

Louis

2008

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Consider a charged, perfect quantum gas, in the effective mass approximation, and in the grand-canonical ensemble. We prove in this paper that the generalized magnetic susceptibilities admit the thermodynamic limit for all admissible fugacities, uniformly on compacts included in the analyticity domain of the grand-canonical pressure.The problem and the proof strategy were outlined in [3]. In [4] we proved in detail the pointwise thermodynamic limit near z = 0. The present paper is the last one of this series, and contains the proof of the uniform bounds on compacts needed in order to apply Vitali's Convergence Theorem.

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Delphine Louis

Diamagnetic expansions for perfect quantum gases

Diamagnetic expansions for perfect quantum gases II: Uniform bounds

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