To the charging of sphere in a EHD gas flow

To the charging of sphere in a EHD gas flow

The interaction between conducting sphere and ions has been investigated in a presence of external electric field and electrohydrodynamic (EHD) gas flow. Gas is considered as weakly ionized under atmospheric pressure. Diffusion is assumed to be weak and the trajectory assumption is taken into consid...

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Дата:2007
Автор: Sorokin, A.E.
Формат: Стаття
Мова:English
Опубліковано: Національний науковий центр «Харківський фізико-технічний інститут» НАН України 2007
Назва видання:Вопросы атомной науки и техники
Теми:
Low temperature plasma and plasma technologies
Онлайн доступ:https://nasplib.isofts.kiev.ua/handle/123456789/110502
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Назва журналу:Digital Library of Periodicals of National Academy of Sciences of Ukraine
Цитувати:НазвTo the charging of sphere in a EHD gas flowание / A.E. Sorokin // Вопросы атомной науки и техники. — 2007. — № 1. — С. 176-178. — Бібліогр.: 3 назв. — англ.

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Digital Library of Periodicals of National Academy of Sciences of Ukraine
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spelling nasplib_isofts_kiev_ua-123456789-1105022025-02-09T14:16:33Z To the charging of sphere in a EHD gas flow Щодо зарядки сфери в ЕГД потоці газа К зарядке сферы в ЭГД потоке газа Sorokin, A.E. Low temperature plasma and plasma technologies The interaction between conducting sphere and ions has been investigated in a presence of external electric field and electrohydrodynamic (EHD) gas flow. Gas is considered as weakly ionized under atmospheric pressure. Diffusion is assumed to be weak and the trajectory assumption is taken into consideration. Ion currents are obtained analytically and investigated numerically for the collinear electric field and gas flow vectors. It is shown, that sphere charging regimes depend on the key parameter ξ± - the relation of ion drift velocity far away from sphere to gas velocity. So, the cases |ξ±| < 1 and |ξ±| > 1 yield to different charging regimes. For the potential flow, the ion current has been found analytically in continuous ξ± -parameter space. Досліджено взаємодію провідної сфери і електрогідродинамічного (ЕГД) газового потоку в присутності зовнішнього електричного поля. Газ передбачається слабко іонізованим. Дифузія іонів нехтується, враховується тільки їхній дрейф і перенос потоком газу. Аналітично і чисельно отримані іонні струми на сферу для випадку потенційного обтікання для будь-яких значень керуючого параметра ξ± - відношення швидкості дрейфу іонів в однорідному електричному полі до швидкості газу удалині від поверхні сфери. Исследовано взаимодействие проводящей сферы и электрогидродинамического (ЭГД) газового потока в присутствии внешнего электрического поля. Газ предполагается слабо ионизованным. Диффузией ионов пренебрегается, учитывается только их дрейф и перенос потоком газа. Аналитически и численно получены ионные токи на сферу для случая потенциального обтекания для любых значений управляющего параметра ξ± - отношение скорости дрейфа ионов в однородном электрическом поле к скорости газа вдали от поверхности сферы. 2007 Article НазвTo the charging of sphere in a EHD gas flowание / A.E. Sorokin // Вопросы атомной науки и техники. — 2007. — № 1. — С. 176-178. — Бібліогр.: 3 назв. — англ. 1562-6016 PACS: 92.60.Pw, 92.60.Mt, 52.40.Kh https://nasplib.isofts.kiev.ua/handle/123456789/110502 en Вопросы атомной науки и техники application/pdf Національний науковий центр «Харківський фізико-технічний інститут» НАН України
institution Digital Library of Periodicals of National Academy of Sciences of Ukraine
collection DSpace DC
language English
topic Low temperature plasma and plasma technologies
Low temperature plasma and plasma technologies
spellingShingle Low temperature plasma and plasma technologies
Low temperature plasma and plasma technologies
Sorokin, A.E.
To the charging of sphere in a EHD gas flow
Вопросы атомной науки и техники
description The interaction between conducting sphere and ions has been investigated in a presence of external electric field and electrohydrodynamic (EHD) gas flow. Gas is considered as weakly ionized under atmospheric pressure. Diffusion is assumed to be weak and the trajectory assumption is taken into consideration. Ion currents are obtained analytically and investigated numerically for the collinear electric field and gas flow vectors. It is shown, that sphere charging regimes depend on the key parameter ξ± - the relation of ion drift velocity far away from sphere to gas velocity. So, the cases |ξ±| < 1 and |ξ±| > 1 yield to different charging regimes. For the potential flow, the ion current has been found analytically in continuous ξ± -parameter space.
format Article
author Sorokin, A.E.
author_facet Sorokin, A.E.
author_sort Sorokin, A.E.
title To the charging of sphere in a EHD gas flow
title_short To the charging of sphere in a EHD gas flow
title_full To the charging of sphere in a EHD gas flow
title_fullStr To the charging of sphere in a EHD gas flow
title_full_unstemmed To the charging of sphere in a EHD gas flow
title_sort to the charging of sphere in a ehd gas flow
publisher Національний науковий центр «Харківський фізико-технічний інститут» НАН України
publishDate 2007
topic_facet Low temperature plasma and plasma technologies
url https://nasplib.isofts.kiev.ua/handle/123456789/110502
citation_txt НазвTo the charging of sphere in a EHD gas flowание / A.E. Sorokin // Вопросы атомной науки и техники. — 2007. — № 1. — С. 176-178. — Бібліогр.: 3 назв. — англ.
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fulltext 176 Problems of Atomic Science and Technology. 2007, 1. Series: Plasma Physics (13), p. 176-178 TO THE CHARGING OF SPHERE IN A EHD GAS FLOW A.E. Sorokin Institute of Applied Physics, RAS, 603950, Nizhny Novgorod, Russia, e-mail: and@appl.sci-nnov.ru The interaction between conducting sphere and ions has been investigated in a presence of external electric field and electrohydrodynamic (EHD) gas flow. Gas is considered as weakly ionized under atmospheric pressure. Diffusion is assumed to be weak and the trajectory assumption is taken into consideration. Ion currents are obtained analytically and investigated numerically for the collinear electric field and gas flow vectors. It is shown, that sphere charging regimes depend on the key parameter ± - the relation of ion drift velocity far away from sphere to gas velocity. So, the cases ±| < 1 and ±| > 1 yield to different charging regimes. For the potential flow, the ion current has been found analytically in continuous ± -parameter space. PACS: 92.60.Pw, 92.60.Mt, 52.40.Kh TASK FORMULATION A conducting sphere moves through the weakly ionized gas with a fixed terminal velocity Up. External electric field is collinear over sphere motion vector. All ions which attach sphere surface recombinate on it. The selectivity properties of the sphere surface are discarded. The equation for ion trajectories in a spherical coordinates may be written as (1) where ± = 1±cos + 0 assuming = 0 for direct flow or = for contrary one, (2) and (3) where r is the radial spherical coordinate normalized on particle radius R, is the azimuth, Bi± = ±|Bi±| are ions mobilities, E is the magnitude of the external uniform electric field and is assumed positive. U is the magnitude of the neutral gas velocity far away from the sphere. The value p reflects particle polarization, for high static relative permittivities, ? 1, pε 1, as for ideal conducting sphere, for "transparent" particle we have pε = 1. ION TRAJECTORIES AND SPECIAL POINTS Steady states for ions are defined from the equations: Vr± = V ± = 0. For the neutral particle, only ions which are being resisted by the external electric field have stationary points with V = 0. In direct flow, = 0, that is negative ions. The limiting trajectories form a separatrix envelope - sphere with a radius RS for | < 1, which is determined from the equation Vr = 0: (4) The same envelope forms and for positive ions in contrary flow, = . We need to substitute + except in (4) to determine RS. Both saddle points, back (r = RS2) and front (r = RS1) lie on the sphere r = RS, but have different azimuths: = is for front saddle point, = 0 is for back one. When sphere acquires the charge then the separating sphere r = RS disintegrates on two independent separatrix surfaces, each is connected with a corresponded saddle point. Fig. 1. Negative ions tracks (potential flow), 1.0145, = 1 One important exclusion concerns the case of potential flow with ±| 1. Let us consider negative ions first. Then RS2⋅RS1 and RS2 > RS, RS1 < RS, where RS is the spherical separatrix radius with the same but with = 0. And in the range ±| > 1, no any stationary points exist for the Stokes flow. But for the potential flow the saddle point RS1 moves to the limit value RS1 = 3 when 1 while RS2 tends to infinity. When turns through the point = 1, the saddle point RS2 returns from infinity but from the opposite direction, = , see Fig.1. This state with two saddles with the same azimuth m = contracts to one saddle ring under = m, = m for positive particle charge ( m < 0): (5) At this special point, r = Rm = 3(2 m 1)/2 m we have Vr± = Vr± r = 0, where “+” is for = 0 and “-“ is for = . The bifurcation in this point, ( m, m), gives rise the saddle ring, see Fig. 2, and in the bifurcation point we have: RS1 = RS2 = RS±. mailto:and@appl.sci-nnov.ru 177 Fig. 2. Negative ions tracks (potential flow), = 1.05, = 1 Coordinates of the saddle rings (RS±, S±), for the negative ions and direct flow, = 0, and for the positive ions in opposite flow, = , are defined from the system Vr± = V ± = 0: (6) When electric field became large, ±| ? 1 and the sphere charge is fixed then the saddle ring (RS , S ) turns to sphere equator (1, /2) asymptotically. The transition of the point (RS , s ) through equator occurs when particle charge has become positive (for negative ions). Positive ions have the same tacks structure in the contrary flow, = and the bifurcation point ( m, m) is determined by expression (5) with substituting m against m. As it will be showed below, the dislocation of saddle ring has an influence on charging ion flux. ION CURRENT, ± < 1 The solution of the equation (1), with boundary conditions at infinity, r sin | , r h be as following: (7) It is supposed that ±| < 1, otherwise the limit will be valid only for positive ions, for negative one it might be 0. To find the cross-section, we have to choose those ions from the flow, which are collected by the sphere: ±(1) = (2pε + 1) ±.. With this, we obtain an expression connecting the impact angle i± with the shoot parameter h±: (8) where sign “+” is for the positive ions flow while “ ” for the negative ions, q% = q/qU , where qU is the maximum charge acquired by the isolated ideal conducting sphere in the unipolar ions environment in the electric field, qU = (2pε + 1)E R2, see [1]. Let us consider, first, positive ions. With varying h+ from 0 to ht+ the impact angle i+ varies from to a+ = arccos( q% ) . So, the threshold shoot distance ht+ is obtained from the (8) with cos i+ = q% : (9) If q% > 0 then Bi+Er(1, ) > 0 for any and, as consequence, all positive ions will be repelled from the aerosol surface and J% + = 0, see (10). Oppositely, if q% < 1 then Bi+Er(1, ) < 0 for any azimuths and all ions in the vicinity of aerosol particle will be attracted by it and J% + = q. The corresponding collision cross- section is: 2 th + = 4 +/(1 + +). Negative ions are resisted by the external electric field for = 0, and it gives income to the current if only q > 0. Then negative ions bend around the particle and impact the surface at the range i ∈ [0, a ], where cos( a ) = 1 2 q% , as it follows from the (8). It defines the ring at the particle surface which is connected by the separatrix paths with the front saddle point (rS , ). Ions from the maximum distance ht move to the back saddle point and attach the sphere surface with i = 0. As it follows from the equation (8) the cross-section be as: 2 th − = 4 /(1 + ). So, the expressions for ht± determine positive and negative charging current. The dimensional current, J±, may be expressed through the collision cross-section 2 th + : (10) or (11) where J0± is the maximum charging current. Summarizing the results, the expressions for the currents be as: (12) After the similar arguments as in the case = 0 charging currents for = may be expressed as: (13) The formulae (12), (13) are the same as obtained in [2] by another way. Actually, the method of integration over the sphere surface (to sum all ions tracks and deduce the current) was used in [3] for fast ions ±| >1. Following this assumption and integrating the value 3 cos + over the sphere surface from = 0 till = a we have: (14) But, as we will find in the next paragraph, that is correct only for ±| ? 1 - it’s not for the general case. For | q% | > 1 integration should be performed over the all sphere surface that gives J% + = 0 and J% = 4 q% for q% 1; J% + = q and J% = 0 for q% 1. ION CURRENT, ± 1 The new results are presented below for the "fast" ions. 178 Potential flow with ±| > 1 has stationary points as it is shown in Fig. 1,2 and has closed ion paths. Let us consider the parameter space ( ±, ±) for negative ions and let = 0. When |∈ [1, | m|] the current is determined by formula (12), right side. But for | > m we have to find the attachment azimuth which is not equal to the old value a = arccos (1 2 q% ) for q% > 0 (positive net charge, negative ions). Since, the coordinate for saddle ring is known, we can connect two conjugate points (1, a ) and (1, θ% a ) with separatrix ring state (RS , S ). Thus, all these points lie on the same ion path, see Fig. 2. Solving (1) for closed separatrix path and using the relation cos a± + cosθ% ±= -2 q% gives: (15) where q% S = ( 1(RS ) + 0(RS ))/3 , 0, 1 are the flow function for potential flow determined by (2). Extending this expression for the positive ions too, q% S± is written as: (16) where (RS±, S±) are the coordinates of the saddle ring. Integrating the radial electric field over the sphere and using the relation cos S = q% / q% S the negative ion current be as: (17) At the point ( m, m) we have q% S = q% and formula (17) yields: J% = 4 q% that is the same as for all range | < | m|. From the other side, in the limit | ? 1, current turns to the value (1 + q% )2, since q% S 1. Finally, for all q% range, | > 1, = 0, negative ions current is: , (18) where q% S = (1 + 2 |)/2 |RS and it is always positive. If q% 1 the current remains a constant for all ±. For positive ions there are no closed tracks if +| > 1, = 0. So, J% + can be obtained by the simple integration over the sphere with limit azimuth cos a+ = 1 2 q% . It gives the left part of equation (17). Due to the symmetry, currents J% ± for = can be obtained using the following substitution in (18): J% ± J m % , +, q% q% , q% s q% S+, and setting - in formula for q% S : (19) where q% S+ = (1 + 2 +)/2 +RS+, and J% is determined by the right side of (20). Near the point ±| = 1 we can find that q% S± ≈ (1.5)2/3(δξ)1/3 = 1, where = ± 1. But if ±| ? 1 then q% s± 1 1/3 ± 2 ∼ 1. At this limit formulas (19) and (18) became equivalent. This means that current does not depend on angle if ±| ? 1. That is right also for Stokes flow for any ±| > 1, then current will be expressed by the formula (19) with q% S+ = 1. REFERENCES 1. M.M. Pouthenier and M. Moreau-Hanot. La charge des particules spheriques dans un champ ionise // J. Physique. 1932, v.12, p.590–613. 2. J.A. Chalmers, F.J.W. Whipple. On Wilson’s theory of the collection of charge by falling drops // Quart. Journal of Royal Meteorologycal Society. 1944, v.70, N304, p.103–120. 3. G.F. Drukarev. To charges of raindrops // Proc. USSR Acad. Sci. 1947, v.6, N8, pp. 330–336. . ( ) . . , . ± - . . ( ) . . , . ± - .

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