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International Journal of Fluid Mechanics Research
Главный редактор: Atle Jensen (open in a new tab)
Заместитель главного редактора: Valery Oliynik (open in a new tab)
Редактор-основатель: Victor T. Grinchenko (open in a new tab)

Выходит 6 номеров в год

ISSN Печать: 2152-5102

ISSN Онлайн: 2152-5110

The Impact Factor measures the average number of citations received in a particular year by papers published in the journal during the two preceding years. 2017 Journal Citation Reports (Clarivate Analytics, 2018) IF: 1.1 To calculate the five year Impact Factor, citations are counted in 2017 to the previous five years and divided by the source items published in the previous five years. 2017 Journal Citation Reports (Clarivate Analytics, 2018) 5-Year IF: 1.3 The Eigenfactor score, developed by Jevin West and Carl Bergstrom at the University of Washington, is a rating of the total importance of a scientific journal. Journals are rated according to the number of incoming citations, with citations from highly ranked journals weighted to make a larger contribution to the eigenfactor than those from poorly ranked journals. Eigenfactor: 0.0002 The Journal Citation Indicator (JCI) is a single measurement of the field-normalized citation impact of journals in the Web of Science Core Collection across disciplines. The key words here are that the metric is normalized and cross-disciplinary. JCI: 0.33 SJR: 0.256 SNIP: 0.49 CiteScore™:: 2.4 H-Index: 23

Indexed in

The Point-Particle/Continuum-Field Theory of Spray Flows

Том 24, Выпуск 1-3, 1997, pp. 149-159
DOI: 10.1615/InterJFluidMechRes.v24.i1-3.150
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Краткое описание

A general theory of spray (or other particle) flows is proposed. It is based on the approximations that the particles in the flow may be treated as points which displace no volume, are adequately described by use of a particle state vector, and which undergo instantaneous transitions between states. The flow in which these particles are embedded is assumed to be a space-filling continuum, describable at the level of the Navier-Stokes equations. Consideration of the information content of such a flow leads to definition of a phase space in which any spray flow will occupy a unique location at any instant in time. By computing the number density of such system points in this space, and deriving a transport equation for that number density, the evolution of any distribution of spray flows may, in principal, be solved for at all subsequent times.

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