### Details

#### Title

Boltzmann Equation In The Modeling Of Mineral Processing#### Journal title

Archives of Mining Sciences#### Yearbook

2015#### Numer

No 2#### Authors

#### Divisions of PAS

Nauki o Ziemi#### Publisher

Committee of Mining PAS#### Date

2015[2015.01.01 AD - 2015.12.31 AD]#### Identifier

ISSN 0860-7001#### References

Bozhenko (2011), Mathematical model of the milling process on the ring - roller s table Part I Mathematical model and it s numeric solution Arch, Min Sci, 56. ; Anikin (2012), Computing of gas flows in micro - and nanoscale channels on the base of the Boltzmann kinetic equation, Procedia Computer Science, 1. ; Li (2011), Adhesive particulate flow : The discrete - element method and its application in energy and environmental engineering Progress in Energy and, Combustion Science, 37. ; Brożek (2005), The physical model of partition function of the enrichment process in a heavy liquid Arch, Min Sci, 50. ; Berthiaux (2005), Application of the theory of Markov chains to model different processes in particle technology, Powder Technology, 157. ; Kubo (1991), ( in Polish ) PWN, Statistical Physics. ; Mizonov (2008), Application of the theory of Markov chains to model heat and mass transfer between stochastically moving particulate and gas flows, Granular Matter, 10. ; Eibeck (2003), Stochastic interacting particle systems and nonlinear kinetic equations of, Annals Applied Probability, 13.#### DOI

10.1515/amsc-2015-0033