Abstract:
One-particle and binary distribution functions are found and the thermodynamics
of crystal is constructed taking into account collective oscillations of particles. Anharmonic
effects in such crystals are considered.
Citation:
I. P. Bazarov, P. N. Nikolaev, “Theory of a crystal with allowance for collective vibrations”, TMF, 31:1 (1977), 125–132; Theoret. and Math. Phys., 31:1 (1977), 361–366
\Bibitem{BazNik77}
\by I.~P.~Bazarov, P.~N.~Nikolaev
\paper Theory of a crystal with allowance for collective vibrations
\jour TMF
\yr 1977
\vol 31
\issue 1
\pages 125--132
\mathnet{http://mi.mathnet.ru/tmf2943}
\transl
\jour Theoret. and Math. Phys.
\yr 1977
\vol 31
\issue 1
\pages 361--366
\crossref{https://doi.org/10.1007/BF01041244}
Linking options:
https://www.mathnet.ru/eng/tmf2943
https://www.mathnet.ru/eng/tmf/v31/i1/p125
This publication is cited in the following 6 articles:
P. N. Nikolaev, “A new method to obtain the Carnahan–Starling equation and its generalization”, Moscow Univ. Phys., 72:1 (2017), 23
P. N. Nikolaev, “The calculation of singular points in the supercritical region for a system with a Lennard—Jones interaction potential”, Moscow Univ. Phys., 71:1 (2016), 75
P. N. Nikolaev, “The lines of extremes for the second derivatives of the Gibbs potential in the supercritical regions of substances”, Moscow Univ. Phys., 70:2 (2015), 107
P. N. Nikolaev, “Free energy of a crystal in the quantum domain with allowance for correlations”, Soviet Physics Journal, 23:7 (1980), 608
I. P. Bazarov, P. N. Nikolaev, “Method of statistical operators in the theory of crystals”, Theoret. and Math. Phys., 41:3 (1979), 1116–1120
P. N. Nikolaev, “On the limit of absolute stability of crystals”, Soviet Physics Journal, 20:3 (1977), 400