Место работы автора, адрес/электронная почта: Северо-Восточный федеральный университет им. М. К. Аммосова, Физико-технический институт ; 677013, г. Якутск, ул. Кулаковского, 48 ; e-mail: lv.nikiforova@s-vfu.ru, nliudmilav@mail.ru ; https://www.s-vfu.ru/
Область научных интересов: Физика
ID Автора: SPIN-код: 4737-3389, РИНЦ AuthorID: 788081
Количество страниц: 8 с.
- Математика. Естественные науки > Математика,
- Прикладные науки. Медицина. Ветеринария. Техника. Сельское хозяйство > Инженерное дело. Техника в целом,
- НАУКА ЯКУТИИ > МАТЕМАТИКА. ЕСТЕСТВЕННЫЕ НАУКИ > Математика,
- НАУКА ЯКУТИИ > ПРИКЛАДНЫЕ НАУКИ. МЕДИЦИНА. ТЕХНИКА. СЕЛЬСКОЕ ХОЗЯЙСТВО > Инженерное дело. Техника в целом.
In this paper theoretically discusses the motion of particles inside the screw air separator. At the initial stage auxiliary model is considered: particle motion along a conical surface with a given angle under the action of the axiales flow of air. In this case the normal to the surface of the cone has two components: vertical and radial. Model allows to find the law of motion of a particle along a conical surface. To get the screw surface sophisticate model, namely, the components of the surface normal axial add a third component. Then set up will describe the normal helical surface. As the working surface of the spiral air separator is chosen with a specific surface of angle and axial angles. The particle motion occurs only at the working surface. Knowing the law of motion of a single particle, we can determine the trajectory for the system of non-interacting particles. Thus, in a first approximation for non-interacting particles the particle concentration can be determined on a screw surface, as well as in the radial direction and in the vertical plane.
Моделирование движения частиц в винтовом пневмосепараторе / А. И. Матвеев, И. Ф. Лебедев, Л. В. Никифорова, Б. В. Яковлев // Горный информационно-аналитический бюллетень. – 2014. – N 10. – C. 172-178.
Количество страниц: 6 с.
One of the effective methods of separation of heavy grains in the loose environment, for example, of gold grains, is jigging. In the known works on modeling of process of jigging the theory of a Brownian particle is used where the equation like Fokker-Planck's one is solved. Most of the works do not consider interaction of particles of a useful fraction among themselves. This work is devoted to determination of parameters accounting the interaction of these particles. These parameters received by mathematical modeling of the process are determined experimentally. We considered a magnetic in natural sand. This material (heavy fraction) has bigger density than sand (about 1.2 times). The heavy fraction was separated from sand by a permanent magnet. As a result of the study theoretical distributions of the magnetic concentration along the device height adapted with the experimental data are received. The study was conducted under various conditions: dry mix, liquid mix, various operating modes of a vibrator. The received distributions allow under certain initial conditions (for example, at a certain percentage of heavy fraction from the total amount of sand) to calculate probable time for which some preset material layer at the bottom of a jigging machine with a certain concentration of useful fraction is formed. The results of the study have shown that gradient force increases over the time, and environment resistance force on the contrary decreases if at initial time all useful (heavy) fraction was in the top part of sand mass.
Исследование распределения тяжелых фракций в колеблющейся сыпучей среде / А. И. Матвеев, Л. В. Никифорова, Е. С. Слепцова, Б. В. Яковлев // Наука и образование. – 2016. – N 2 (82). – C. 21-26.
Количество страниц: 7 с.
We present a mathematical model of jigging using the statical approach for describing the process and the theory of Brownian motion. The Fokker-Planck equation is obtained for fractions in a jigging machine. The distributions of the grainy rocks under study are calculated in various cases.
Математическое моделирование процесса отсадки / Л. В. Никифорова, А. И. Матвеев, Е. С. Слепцова, Б. В. Яковлев. – Текст : непосредственный // Математические заметки СВФУ. – 2014. – Т. 21, N 1, январь-март. – C. 106-112.
Количество страниц: 7 с.
- Математика. Естественные науки > Математика,
- Прикладные науки. Медицина. Ветеринария. Техника. Сельское хозяйство > Инженерное дело. Техника в целом > Горное дело. Горные предприятия (рудники, шахты, карьеры),
- НАУКА ЯКУТИИ > МАТЕМАТИКА. ЕСТЕСТВЕННЫЕ НАУКИ > Математика,
- НАУКА ЯКУТИИ > ПРИКЛАДНЫЕ НАУКИ. МЕДИЦИНА. ТЕХНИКА. СЕЛЬСКОЕ ХОЗЯЙСТВО > Инженерное дело. Техника в целом > Горное дело. Горные предприятия (рудники, шахты, карьеры).
Математическое моделирование процесса концентрации тяжелых частиц в постели отсадочной машины / Е. С. Слепцова, Л. В. Никифорова, Б. В. Яковлев, А. И. Матвеев // Горный информационно-аналитический бюллетень. – 2014. – N 10. – C. 239-245.