Estimating flow rates in open-channel geometries having capillary pumping vanes
원문보기
IPC분류정보
국가/구분
United States(US) Patent
등록
국제특허분류(IPC7판)
G01F-001/00
G01F-007/00
G06F-019/00
출원번호
US-0864522
(2001-05-24)
발명자
/ 주소
Srinivasan, Radhakrishnan
출원인 / 주소
International Business Machines Corporation
대리인 / 주소
Coca T. Rao
인용정보
피인용 횟수 :
0인용 특허 :
8
초록▼
A method of estimating liquid flow rates in capillary structures has application in determining the surface tension-driven flow rates of liquid fuel in propellant management devices in zero-gravity conditions. Analytic equations governing an assumed open-channel geometry are simplified by reasonable
A method of estimating liquid flow rates in capillary structures has application in determining the surface tension-driven flow rates of liquid fuel in propellant management devices in zero-gravity conditions. Analytic equations governing an assumed open-channel geometry are simplified by reasonable approximations, which allow a modified set of analytic equations to be derived. This modified set of analytic equations is derived by assuming an artificial taper in the capillary passage. Flow rate can be determined from the modified set of equations, which closely approximates the flow rate in the open-channel geometry.
대표청구항▼
1. A method of estimating the flow rate of a liquid through an open-channel geometry, the method comprising steps of:defining (i) an open-channel geometry having an inlet end and an outlet end, between which there is a capillary passage having two parallel walls, (ii) a set of parameters associated
1. A method of estimating the flow rate of a liquid through an open-channel geometry, the method comprising steps of:defining (i) an open-channel geometry having an inlet end and an outlet end, between which there is a capillary passage having two parallel walls, (ii) a set of parameters associated with the open-channel geometry, and (iii) analytical equations involving the set of parameters which govern the flow of liquid through the open-channel geometry; andderiving a modified set of analytic equations corresponding to the governing analytic equations of the open-channel geometry, and solving said modified set of analytic equations to calculate a representative flow rate defined by the modified set of equations;wherein said modified set of equations are derived from a modified open-channel geometry based on an artificial assumption that an elongate dimension of the open-channel geometry is tapered, so that the representative flow rate can be calculated as an approximation of the flow rate in the open-channel geometry. 2. The method as claimed in claim 1, wherein the parameters associated with the open-channel geometry include: length L, height H, and width B oriented along respective orthogonal axes X, Y and Z. 3. The method as claimed in claim 2, wherein the parameters associated with the open-channel geometry include: inlet compartment volume V 1 and outlet compartment volume V 2 associated with respective inlet and outlet compartments. 4. The method as claimed in claim 3, wherein the parameters associated with the open-channel geometry include: liquid viscosity μ, surface tension coefficient σ and contact angle α between the liquid with the open-channel geometry. 5. The method as claimed in claim 4, wherein the parameters associated with the open-channel geometry include: inlet liquid pressure P 1 , outlet liquid pressure P 2 and ambient pressure P 0 . 6. The method as claimed in claim 5, wherein the pressure drop across the length L of the open-channel geometry is assumed to be P 1 −P 2 by neglecting the pressure drops across the inlet and outlet compartments in the modified set of equations. 7. A method as claimed in claim 6, wherein the calculated meniscus radii of curvature R i and R o of the liquid at the inlet and outlet ends of the open-channel geometry is assumed to be independent of the inlet or outlet end geometry, in the modified set of equations. 8. The method as claimed in claim 6, wherein the meniscus radii of curvature R 1 and R 2 at the inlet and outlet compartments of the open-channel geometry is calculated using the contact angle α and the inlet and outlet compartment volumes V 1 and V 2 . 9. The method as claimed in claim 7, wherein the instantaneous pressure difference P 1 −P 2 is determined from the Laplace-Young equation from the respective inlet and outlet meniscus radii R 1 and R 2 , and the surface tension coefficient σ. 10. The method as claimed in claim 1, wherein the representative flow rate is assumed to be independent of the geometries at the inlet and outlet ends, in the modified set of equations. 11. The method as claimed in claim 5, wherein the representative flow rate is calculated for a section L* of the length L over which the flow through the open-channel geometry is assumed to be independent of the geometries of the inlet and outlet ends, in the modified set of equations. 12. The method as claimed in claim 11, wherein the section L* is assumed to be approximated by the length L, in the modified set of equations. 13. The method as claimed in claim 12, wherein the ratios of height H to the respective lengths between the ends of length L and the ends of section L* (namely H/X i and H/(L −X o )) are assumed to be vanishingly small, so that these terms can be disregarded in the modified set of equations. 14. The method as claimed in claim 12, wherein the ratio of height H to length L is assumed to be vanishingly small, so that this term can be disregarded in the modified set of equations. 15. The method as claimed in claim 12, wherein time derivatives are assumed to be vanishingly small such that flow rate is directly related to the instantaneous pressure difference between the inlet end and the outlet end, in the modified set of equations. 16. The method as claimed in claim 1, wherein the taper of the open-channel geometry is assumed to be linear to a first order approximation. 17. The method as claimed in claim 16, wherein the artificial assumption of a tapered height obviates the need to take into account the calculation of wall layers in the open-channel geometry for the analytic governing equations, so that the free surface of the liquid has approximately a constant radius of curvature, which is able to satisfy requirements of the contact angle α. 18. The method as claimed in claim 4, wherein the artificial assumption that a dimension of the open-channel geometry is tapered is made in the modified set of equations so that the modified set of equations can be solved when derived on the assumption that the radius of curvature R of the free surface of the liquid can be calculated as: 19. The method as claimed in claim 1, wherein said modified set of equations are derived on the assumption that the free surface of the liquid of the inlet and/or outlet is nearly circular, except for small deviations which maintain the contact angle between the liquid and the open-channel geometry. 20. The method as claimed in claim 5, wherein a parameter δ defines a linear taper in average height H, such that the inlet and outlet heights H i and H o are given by: 21. The method as claimed in claim 20, wherein the parameter δ is in the range (0, 1]. 22. The method as claimed in claim 21, wherein the differing radii of curvature R i and R o of the free surface at the inlet and outlet ends of the modified open-channel geometry can be respectively calculated while maintaining the relationship between the contact angle α and the heights H i and H o at the inlet end and outlet end. 23. The method as claimed in claim 22, wherein the pressure difference across the length L of the modified open-channel geometry is assumed to be P i −P o by neglecting the velocity of the liquid through the open-channel geometry. 24. The method as claimed in claim 23, wherein the pressure drop across the open-channel geometry is equated with the pressure drop across the modified open-channel geometry to determine the parameter δ. 25. The method as claimed in claim 24, wherein the parameter δ is sufficiently close to 1 that the representative flow rate deviates from the flow rate in the open-channel geometry primarily in respect of small layers of liquid flow near the walls of the open-channel geometry. 26. The method as claimed in claim 1, wherein the modified open-channel geometry is represented in the modified set of equations in non-dimensional form. 27. The method as claimed in claim 1, wherein the Reynolds number associated with the liquid flow is assumed to be sufficiently small that inertial effects can be disregarded, in the modified set of equations. 28. The method as claimed in claim 1, wherein an upper bound to the flow rate in the open-channel geometry can be determined using the modified set of equations in which cross-flow dissipation of the liquid flow through the open-channel geometry is assumed to be zero. 29. The method as claimed in claim 1, wherein the modified set of equations are solved with a finite difference scheme using a weighted least-squares algorithm. 30. The method as claimed in claim 1, wherein the parallel walls of the open-channel geometry represent a fuel tank wall and a vane in a propellant management device for delivering liquid fuel. 31. An apparatus for estimating the flow rate of a liquid through an open-channel geometry, the apparatus comprising:means for defining (i) an open-channel geometry h aving an inlet end and an outlet end, between which there is a capillary passage having two parallel walls, (ii) a set of parameters associated with the open-channel geometry, and (iii) analytical equations involving the set of parameters which govern the flow of liquid through the open-channel geometry; andmeans for deriving a modified set of analytic equations corresponding to the governing analytic equations of the open-channel geometry, and solving said modified set of analytic equations to calculate a representative flow rate defined by the modified set of equations;wherein said modified set of equations are derived from a modified open-channel geometry based on an artificial assumption that an elongate dimension of the open-channel geometry is tapered, so that the representative flow rate can be calculated as an approximation of the flow rate in the open-channel geometry. 32. A computer program product having a computer readable medium having a computer program recorded therein for estimating the flow rate of a liquid through an open-channel geometry, said computer program comprising:code means for recording a definition of (i) an open-channel geometry having an inlet end and an outlet end, between which there is a capillary passage having two parallel walls, (ii) a set of parameters associated with the open-channel geometry, and (iii) analytical equations involving the set of parameters which govern the flow of liquid through the open-channel geometry; andcode means for storing a modified set of analytic equations corresponding to the governing analytic equations of the open-channel geometry, and solving said modified set of analytic equations to calculate a representative flow rate defined by the modified set of equations;wherein said modified set of equations are derived from a modified open-channel geometry based on an artificial assumption that an elongate dimension of the open-channel geometry is tapered, so that the representative flow rate can be calculated as an approximation of the flow rate in the open-channel geometry.
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