Vortex Shedding From Two Circular Cylinders in Staggered Arrangement

The frequency of vortex shedding from two circular cylinders of the same diameter in staggered arrangement is experimentally investigated at a Reynolds number of 1.58 × 104. This Reynolds number is within the range where the flow around a circular cylinder is relatively insensitive to Reynolds number changes. The results are summarized in several figures from which one can obtain the Strouhal number of vortex shedding for all arrangements within distances between their centers less than 5 diameters.

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Vortex Shedding From Two Circular Cylinders in a Staggered Arrangement

Volume 2: Symposia, Parts A, B, and C ◽

10.1115/fedsm2003-45519 ◽

2003 ◽

Cited By ~ 1

Author(s):

D. Sumner ◽

M. D. Richards

Keyword(s):

Strouhal Number ◽

Vortex Shedding ◽

Bluff Body ◽

Incidence Angle ◽

Power Spectra ◽

Circular Cylinders ◽

Aerodynamic Forces ◽

Staggered Arrangement ◽

Pitch Ratio ◽

Small Increments

Vortex shedding from two circular cylinders of equal diameter in a staggered configuration was studied experimentally in the subcritical Reynolds number regime, for Re = 3.2×104–7.4×104. The dimensionless centre-to-centre pitch ratio of the staggered cylinders was ranged from P/D = 1.125–4.0, and the incidence angle was varied in small increments from α = 0°–90°. The behaviour of the Strouhal number measurements was broadly classified according to whether the cylinders were closely, moderately, or widely spaced, corresponding to P/D < 1.5, 1.5 ≤ P/D ≤ 2.5, and P/D > 2.5, respectively. For closely spaced staggered configurations, the flow around the cylinders is similar to a single bluff body, and only a single Strouhal number is measured. For moderately spaced cylinders, two distinct Strouhal numbers are measured when α > 30°, but there is considerable scatter in the Strouhal data when α < 30°. For widely spaced cylinders, the Strouhal numbers remain close to that of a single circular cylinder, in contrast to the behaviour of the aerodynamic forces. Evidence of the outer lift peak is seen in the power spectra for the downstream cylinder.

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On vortex shedding from a circular cylinder in the critical Reynolds number régime

Journal of Fluid Mechanics ◽

10.1017/s0022112069000735 ◽

1969 ◽

Vol 37 (3) ◽

pp. 577-585 ◽

Cited By ~ 238

Author(s):

P. W. Bearman

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Strouhal Number ◽

Vortex Shedding ◽

Critical Reynolds Number ◽

Narrow Band ◽

Critical Regime ◽

Number Range ◽

Velocity Fluctuations ◽

Reynolds Number Range

The flow around a circular cylinder has been examined over the Reynolds number range 105 to 7·5 × 105, Reynolds number being based on cylinder diameter. Narrow-band vortex shedding has been observed up to a Reynolds number of 5·5 × 105, i.e. well into the critical régime. At this Reynolds number the Strouhal number reached the unusually high value of 0·46. Spectra of the velocity fluctuations measured in the wake are presented for several values of Reynolds number.

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On the relationship of effective Reynolds number and Strouhal number for the laminar vortex shedding of a heated circular cylinder

Physics of Fluids ◽

10.1063/1.870391 ◽

2000 ◽

Vol 12 (6) ◽

pp. 1401-1410 ◽

Cited By ~ 67

Author(s):

An-Bang Wang ◽

Zdenek Trávníček ◽

Kai-Chien Chia

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Strouhal Number ◽

Vortex Shedding ◽

Relationship Of ◽

The Relationship ◽

Effective Reynolds Number

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A Numerical Study of Geometrical Effects on the Strouhal Number of a Circular Cylinder

Volume 1: Advances in Aerospace Technology ◽

10.1115/imece2008-69034 ◽

2008 ◽

Author(s):

Farzan Kazemifar ◽

Mehdi Molai ◽

Bahar Firoozabadi ◽

Goodarz Ahmadi

Keyword(s):

Circular Cylinder ◽

Strouhal Number ◽

Vortex Shedding ◽

Numerical Study ◽

Circular Cylinders ◽

Percentage Reduction ◽

Blade Angle ◽

Vortex Shedding Frequency ◽

Shedding Frequency ◽

Geometrical Effects

In this paper, reducing the Strouhal number of a circular cylinder is studied numerically. Two-dimensional numerical simulations of flow over a normal circular cylinder and various modified circular cylinders are carried out using FLUENT® soft ware. Two small blades are attached to a circular cylinder and the effects of variation of the blades length and the blade angle are studied numerically. The blade angle is chosen 2α = 0°, 30°, 90°, 120° and 150°. The blades length is chosen l/d = 0.125, 0.25, 0.375. Effects of blade angles and blade lengths were studied for both 2α = 0° and 150°. Results show that increasing in blade lengths decreases the Strouhal number. Moreover, as the blade angle was increased from zero to 90°, the percentage reduction in Strouhal number decreased; however, as the blade angle was further increased from 90° to 150°, the percentage reduction in Strouhal number increased. Although the modifications studied here decrease the vortex shedding frequency they make the vortices shed from the cylinder farther and stronger hence increasing the magnitude of the fluctuating forces.

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A Numerical Study of Vortex Shedding From One and Two Circular Cylinders

Aeronautical Quarterly ◽

10.1017/s000192590000901x ◽

1981 ◽

Vol 32 (1) ◽

pp. 48-71 ◽

Cited By ~ 26

Author(s):

P.K. Stansby

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Vortex Shedding ◽

Potential Flow ◽

Numerical Study ◽

Circular Cylinders ◽

Discrete Vortex ◽

Formation Region ◽

Flow Features ◽

The Mean

SummaryA discrete-vortex representation of the wake of a circular cylinder, in which vortices are convected in a potential-flow calculation and maintain their identities unless they approach one another or a surface closely, predicts many of the unsteady flow features and is computationally more efficient than other schemes. The mean rate of shedding of vorticity is adjusted to be compatible with experiments at a high subcritical Reynolds number of 3 × 104 and the model gives reasonable predictions of separation, drag, lift, Strouhal number and vorticity loss in the formation region. The method is extended to accommodate a second cylinder and many of the surprising features which have been observed experimentally with two cylinders in a side-by-side arrangement are reproduced.

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Numerical analysis of two-dimensional motion of a freely falling circular cylinder in an infinite fluid

Journal of Fluid Mechanics ◽

10.1017/s0022112008001304 ◽

2008 ◽

Vol 604 ◽

pp. 33-53 ◽

Cited By ~ 22

Author(s):

KAK NAMKOONG ◽

JUNG YUL YOO ◽

HYOUNG G. CHOI

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Strouhal Number ◽

Vortex Shedding ◽

Velocity Vector ◽

Density Ratio ◽

Transverse Motion ◽

Stream Velocity ◽

Gravitational Acceleration ◽

Two Dimensional

The two-dimensional motion of a circular cylinder freely falling or rising in an infinite fluid is investigated numerically for the range of Reynolds number Re, < 188 (Galileo number G < 163), where the wake behind the cylinder remains two-dimensional, using a combined formulation of the governing equations for the fluid and the dynamic equations for the cylinder. The effect of vortex shedding on the motion of the freely falling or rising cylinder is clearly shown. As the streamwise velocity of the cylinder increases due to gravity, the periodic vortex shedding induces a periodic motion of the cylinder, which is manifested by the generation of the angular velocity vector of the cylinder parallel to the cross-product of the gravitational acceleration vector and the transverse velocity vector of the cylinder. Correlations of the Strouhal–Reynolds-number and Strouhal–Galileo-number relationship are deduced from the results. The Strouhal number is found to be smaller than that for the corresponding fixed circular cylinder when the two Reynolds numbers based on the streamwise terminal velocity of the freely falling or rising circular cylinder and the free-stream velocity of the fixed one are the same. From numerical experiments, it is shown that the transverse motion of the cylinder plays a crucial role in reducing the Strouhal number. The effect of the transverse motion is similar to that of suction flow on the low-pressure side, where a vortex is generated and then separates, so that the pressure on this side recovers with the vortex separation retarded. The effects of the transverse motion on the lift, drag and moment coefficients are also discussed. Finally, the effect of the solid/fluid density ratio on Strouhal–Reynolds-number relationship is investigated and a plausible correlation is proposed.

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Pressure Distributions Around Circular Cylinders in Oscillating Flow

Journal of Fluids Engineering ◽

10.1115/1.3240644 ◽

1980 ◽

Vol 102 (2) ◽

pp. 191-195 ◽

Cited By ~ 1

Author(s):

C. Dalton ◽

B. Chantranuvatana

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Pressure Distribution ◽

Vortex Shedding ◽

Flow Reversal ◽

Oscillatory Motion ◽

Circular Cylinders ◽

Oscillating Flow ◽

Average Pressure ◽

Pressure Distributions

Oscillatory motion of a circular cylinder is studied from the viewpoint of the average pressure distribution on the cylinder. Effects of Reynolds number up to 40,000, period, and Keulegan and Carpenter number on the pressure distribution are examined. Results are explained in terms of vortex shedding and its relationship to period and Keulegan-Carpenter number. The effects of flow reversal, sweeping wake vortices back over the cylinder, are discussed.

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Vortex shedding from a circular cylinder in moderate-Reynolds-number shear flow

Journal of Fluid Mechanics ◽

10.1017/s0022112080001899 ◽

1980 ◽

Vol 101 (4) ◽

pp. 721-735 ◽

Cited By ~ 80

Author(s):

Masaru Kiya ◽

Hisataka Tamura ◽

Mikio Arie

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Shear Flow ◽

Vortex Shedding ◽

Transverse Velocity ◽

Number Range ◽

Uniform Shear ◽

Reynolds Number Range ◽

Moderate Reynolds Number ◽

Shear Parameter

The frequency of vortex shedding from a circular cylinder in a uniform shear flow and the flow patterns around it were experimentally investigated. The Reynolds number Re, which was defined in terms of the cylinder diameter and the approaching velocity at its centre, ranged from 35 to 1500. The shear parameter, which is the transverse velocity gradient of the shear flow non-dimensionalized by the above two quantities, was varied from 0 to 0·25. The critical Reynolds number beyond which vortex shedding from the cylinder occurred was found to be higher than that for a uniform stream and increased approximately linearly with increasing shear parameter when it was larger than about 0·06. In the Reynolds-number range 43 < Re < 220, the vortex shedding disappeared for sufficiently large shear parameters. Moreover, in the Reynolds-number range 100 < Re < 1000, the Strouhal number increased as the shear parameter increased beyond about 0·1.

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Steady approach of unsteady low-Reynolds-number flow past two rotating circular cylinders

Journal of Fluid Mechanics ◽

10.1017/jfm.2013.503 ◽

2013 ◽

Vol 736 ◽

pp. 414-443 ◽

Cited By ~ 5

Author(s):

Y. Ueda ◽

T. Kida ◽

M. Iguchi

Keyword(s):

Reynolds Number ◽

Circular Cylinder ◽

Stokes Equations ◽

Low Reynolds Number ◽

Vortex Method ◽

The Self ◽

Circular Cylinders ◽

Far Field ◽

Flow Past ◽

Low Reynolds

AbstractThe long-time viscous flow about two identical rotating circular cylinders in a side-by-side arrangement is investigated using an adaptive numerical scheme based on the vortex method. The Stokes solution of the steady flow about the two-cylinder cluster produces a uniform stream in the far field, which is the so-called Jeffery’s paradox. The present work first addresses the validation of the vortex method for a low-Reynolds-number computation. The unsteady flow past an abruptly started purely rotating circular cylinder is therefore computed and compared with an exact solution to the Navier–Stokes equations. The steady state is then found to be obtained for $t\gg 1$ with ${\mathit{Re}}_{\omega } {r}^{2} \ll t$, where the characteristic length and velocity are respectively normalized with the radius ${a}_{1} $ of the circular cylinder and the circumferential velocity ${\Omega }_{1} {a}_{1} $. Then, the influence of the Reynolds number ${\mathit{Re}}_{\omega } = { a}_{1}^{2} {\Omega }_{1} / \nu $ about the two-cylinder cluster is investigated in the range $0. 125\leqslant {\mathit{Re}}_{\omega } \leqslant 40$. The convection influence forms a pair of circulations (called self-induced closed streamlines) ahead of the cylinders to alter the symmetry of the streamline whereas the low-Reynolds-number computation (${\mathit{Re}}_{\omega } = 0. 125$) reaches the steady regime in a proper inner domain. The self-induced closed streamline is formed at far field due to the boundary condition being zero at infinity. When the two-cylinder cluster is immersed in a uniform flow, which is equivalent to Jeffery’s solution, the streamline behaves like excellent Jeffery’s flow at ${\mathit{Re}}_{\omega } = 1. 25$ (although the drag force is almost zero). On the other hand, the influence of the gap spacing between the cylinders is also investigated and it is shown that there are two kinds of flow regimes including Jeffery’s flow. At a proper distance from the cylinders, the self-induced far-field velocity, which is almost equivalent to Jeffery’s solution, is successfully observed in a two-cylinder arrangement.

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Strouhal Number for VIV Excitation of Long Slender Structures

Volume 5: Pipelines, Risers, and Subsea Systems ◽

10.1115/omae2018-77433 ◽

2018 ◽

Author(s):

Andrew E. Potts ◽

Douglas A. Potts ◽

Hayden Marcollo ◽

Kanishka Jayasinghe

Keyword(s):

Reynolds Number ◽

Strouhal Number ◽

Degrees Of Freedom ◽

Measurement Techniques ◽

Cross Flow ◽

Degree Of Freedom ◽

Circular Cylinders ◽

Two Degrees Of Freedom ◽

Shedding Frequency ◽

Eddy Shedding

The prediction of Vortex-Induced Vibration (VIV) of cylinders under fluid flow conditions depends upon the eddy shedding frequency, conventionally described by the Strouhal Number. The most commonly cited relationship between Strouhal Number and Reynolds Number for circular cylinders was developed by Lienhard [1], whereby the Strouhal Number exhibits a consistent narrow band of about 0.2 (conventional across the sub-critical Re range), with a pronounced hump peaking at about 0.5 within the critical flow regime. The source data underlying this relationship is re-examined, wherein it was found to be predominantly associated with eddy shedding frequency about fixed or stationary cylinders. The pronounced hump appears to be an artefact of the measurement techniques employed by various investigators to detect eddy-shedding frequency in the wake of the cylinder. A variety of contemporary test data for elastically mounted cylinders, with freedom to oscillate under one degree of freedom (i.e. cross flow) and two degrees of freedom (i.e. cross flow and in-line) were evaluated and compared against the conventional Strouhal Number relationship. It is well established for VIV that the eddy shedding frequency will synchronise with the near resonant motions of a dynamically oscillating cylinder, such that the resultant bandwidth of lock-in exhibits a wider range of effective Strouhal Numbers than that reflected in the narrow-banded relationship about a mean of 0.2. However, whilst cylinders oscillating under one degree of freedom exhibit a mean Strouhal Number of 0.2 consistent with fixed/stationary cylinders, cylinders with two degrees of freedom exhibit a much lower mean Strouhal Number of around 0.14–0.15. Data supports the relationship that Strouhal Number does slightly diminish with increasing Reynolds Number. For oscillating cylinders, the bandwidth about the mean Strouhal Number value appears to remain largely consistent. For many practical structures in the marine environment subject to VIV excitation, such as long span, slender risers, mooring lines, pipeline spans, towed array sonar strings, and alike, the long flexible cylinders will respond in two degrees of freedom, where the identified difference in Strouhal Number is a significant aspect to be accounted for in the modelling of its dynamic behaviour.

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