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Abstract
For the ideal Fermi gas that fills the space inside a cylindrical tube, there are calculated the thermodynamic characteristics in general form for arbitrary temperatures, namely: the thermodynamic potential, energy, entropy, equations of state, heat capacities and compressibilities. All these quantities are expressed through the introduced standard functions and their derivatives. The radius of the tube is considered as an additional thermodynamic variable. It is shown that at low temperatures in the quasi-one-dimensional case the temperature dependencies of the entropy and heat capacities remain linear. The dependencies of the entropy and heat capacities on the chemical potential have sharp maximums at the points where the filling of a new discrete level begins. The character of dependencies of thermodynamic quantities on the tube radius proves to be qualitatively different in the cases of fixed linear and fixed total density. At the fixed linear density these dependencies are monotonous and at the fixed total density they have an oscillating character. Key words: Fermi particle, nanotube, thermodynamic functions, low-dimensional systems, equation of state, heat capacity, compressibility
Highlights
Ⱦɥɹ ɿɞɟɚɥɶɧɨɝɨ ɮɟɪɦɿ-ɝɚɡɭ, ɹɤɢɣ ɡɚɩɨɜɧɸɽ ɩɪɨɫɬɿɪ ɭɫɟɪɟɞɢɧɿ ɧɚɧɨɬɪɭɛɤɢ, ɭ ɡɚɝɚɥɶɧɨɦɭ ɜɢɝɥɹɞɿ ɞɥɹ ɞɨɜɿɥɶɧɢɯ ɬɟɦɩɟɪɚɬɭɪ ɨɛɱɢɫɥɟɧɿ ɬɟɪɦɨɞɢɧɚɦɿɱɧɿ ɯɚɪɚɤɬɟɪɢɫɬɢɤɢ, ɚ ɫɚɦɟ: ɬɟɪɦɨɞɢɧɚɦɿɱɧɢɣ ɩɨɬɟɧɰɿɚɥ, ɟɧɟɪɝɿɹ, ɟɧɬɪɨɩɿɹ, ɪɿɜɧɹɧɧɹ ɫɬɚɧɭ, ɬɟɩɥɨɽɦɧɨɫɬɿ ɬɚ ɫɬɢɫɥɢɜɨɫɬɿ. ȼɫɿ ɰɿ ɜɟɥɢɱɢɧɢ ɜɢɪɚɠɟɧɿ ɱɟɪɟɡ ɜɜɟɞɟɧɿ ɫɬɚɧɞɚɪɬɧɿ ɮɭɧɤɰɿʀ ɬɚ ʀɯ ɩɨɯɿɞɧɿ
It is essential that thermodynamic characteristics of the ideal Fermi gas at arbitrary temperatures in the volume case can be expressed through the special Fermi functions, and it is possible to obtain and verify all relations of the phenomenological thermodynamics on the basis of the quantum microscopic model
The exact formulas for calculation of the thermodynamic functions of the ideal Fermi gas that fills the tube of an arbitrary radius at arbitrary temperature have been derived in the work
Summary
For the ideal Fermi gas that fills the space inside a cylindrical tube, there are calculated the thermodynamic characteristics in general form for arbitrary temperatures, namely: the thermodynamic potential, energy, entropy, equations of state, heat capacities and compressibilities. All these quantities are expressed through the introduced standard functions and their derivatives. There are calculated its thermodynamic characteristics in general form for arbitrary temperatures, namely: the thermodynamic potential, energy, entropy, equations of state, heat capacities and compressibilities All these quantities are expressed through the standard functions introduced in the work and their derivatives. After integration over momenta the thermodynamic potential Ω , number of particles N , energy E and entropy
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