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{{AC|front=AC 2-07|description=Description_AC2-07|testdata=Test Case_AC2-07|cfdsimulations=CFD Simulations_AC2-07|evaluation=Evaluation_AC2-07|qualityreview=Quality Review_AC2-07|bestpractice=Best Practice Advice_AC2-07|relatedUFRs=Related UFRs_AC2-07}}
='''Confined double annular jet'''=
='''Confined double annular jet'''=


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Orientation of axis and sign conventions: since the geometry is axisymmetric, in the following a cylindrical coordinate system is considered (x,z,q), where x is the axial coordinate (the distance from the exit of the burner, along its axis), z is the radial coordinate (the distance from the axis) and q the tangential coordinate, not considered here due to axisymmetry.
Orientation of axis and sign conventions: since the geometry is axisymmetric, in the following a cylindrical coordinate system is considered (x,z,q), where x is the axial coordinate (the distance from the exit of the burner, along its axis), z is the radial coordinate (the distance from the axis) and q the tangential coordinate, not considered here due to axisymmetry.


{|border="1" cellpadding="20" cell spacing="0"
{|border="1" cellpadding="20" cell spacing="0" align="center"
|+ align="bottom"|<b>Table 1 Definition of Some Geometric Parameters</b>
!Parameter!!Description
!Parameter!!Description
|-
|-
|<math>r_1</math> || radius of the primary jet
|align="center"|''r<sub>1</sub>''||align="center"| radius of the primary jet
|-
|-
|<math>r_2</math> || radius of the secondary jet
|align="center"|''r<sub>2</sub>''||align="center"| radius of the secondary jet
|-
|-
|dr || width of annual jets
|align="center"|''dr''||align="center"| width of annular jets
|-
|-
|<math>r_c</math> || radius of the combustion chamber
|align="center"|''r<sub>c</sub>''||align="center"| radius of the combustion chamber
|-
|-
|<math>\[\beta=\frac{r_2}{r_1}\]</math> || secondary to primary radius ratio
|align="center"|<math>\beta=\frac{r_2}{r_1}</math> ||align="center"| secondary to primary radius ratio
|-
|-
|<math>\[{Y}=\frac{A_e}{A_1} = \frac{r^2_c}{2r_1dr}\]</math> || exit area to primary area ratio
|align="center"|<math>{Y}=\frac{A_e}{A_1} = \frac{r^2_c}{2r_1dr}</math> ||align="center"| exit area to primary area ratio
|}
|}


Table 1: Definition of some geometric parameters.
 




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Figure 3: The diameters of the boundaries of the streams produced by the burner.
Figure 3: The diameters of the boundaries of the streams produced by the burner.


=='''Flow Physics and Fluid Dynamics Data'''==
=='''Flow Physics and Fluid Dynamics Data'''==
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The GNDP are the Reynolds number and the Craya-Curtet numbers, presented in Table 2. The Reynolds number is defined using the bulk-averaged velocity of the secondary jet and its diameter. The Craya-Curtet number characterizes the recirculation of confined jet flows. It was shown experimentally for some simple annular jet flows that the flow and mixing properties of the classical axisymmetric confined jet depend only on the Craya-Curtet number. It is assumed here that this number is also governing the physics of the double annular jet flow. The Craya-Curtet number can be defined as a normalization of the stagnation pressure loss in the system:
The GNDP are the Reynolds number and the Craya-Curtet numbers, presented in Table 2. The Reynolds number is defined using the bulk-averaged velocity of the secondary jet and its diameter. The Craya-Curtet number characterizes the recirculation of confined jet flows. It was shown experimentally for some simple annular jet flows that the flow and mixing properties of the classical axisymmetric confined jet depend only on the Craya-Curtet number. It is assumed here that this number is also governing the physics of the double annular jet flow. The Craya-Curtet number can be defined as a normalization of the stagnation pressure loss in the system:


<math>\[\frac{g\Delta{P}\star}{U_e^2p} = \frac{1}{C_t^2}\] </math>           (1)
 
<center><math>
\frac{g\Delta{P}^\star}{U_e^2\rho} = \frac{1}{C_t^2}\qquad\qquad\qquad\qquad(1)
</math></center>




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{|border="1" cell padding="20" cell spacing="0"
{|border="1" cell padding="20" cell spacing="0" align="center" width="600"
|+ align="bottom"|<b>Table 2 Different Parameters of the AC</b>
!Parameter!!Symbol!!Definition
!Parameter!!Symbol!!Definition
|-
|-
|         || <math>U_1</math> || Bulk average velocity of the primal jet
|align="center" rowspan="5"|Fluid Dynamic Parameters||align="center"|''U<sub>1</sub>''||align="center"|Bulk average velocity of the primary jet
|-
|-
|         || <math>U_2</math> || Bulk average velocity of the secondary jet
|align="center"|''U<sub>2</sub>''||align="center"|Bulk average velocity of the secondary jet
|-
|-
|Fluid || <math>U_e</math> || Bulk average velocity of the average stream
|align="center"|''U<sub>e</sub>''||align="center"|Bulk average velocity of the average stream
|-
|-
|Dynamic || <math>\[\Delta P\star = P\star_e - P\star_i\]</math> || Stagnation pressure loss in the system (difference between exit and entrance stagnation pressure)
|align="center"|<math>\Delta P^\star = P^\star_e - P^\star_i</math> ||align="center"|Stagnation pressure loss in the system (difference between exit and entrance stagnation pressure)
|-
|-
|Parameters || <math>\rho</math> || Density
|align="center"|''&rho;''||align="center"|Density
|-
|-
|Problem || <math>\[a = \frac{U_2}{U_1}\]</math> || Secondary to primary bulk-averae velocity ratio
|align="center" rowspan="3"|Problem Definition Parameters (PDPs)||align="center"| <math>\alpha = \frac{U_2}{U_1}</math> ||align="center"|Secondary to primary bulk-average velocity ratio
|-
|-
|Definition || <math>\[\beta = \frac{r_2}{r_1}\]</math> || Secondary to primary radius ratio
|align="center"|<math>\beta = \frac{r_2}{r_1}</math> ||align="center"|Secondary to primary radius ratio
|-
|-
|Parameters (PDP) || <math>\[Y = \frac{A_e}{A_1} = \frac{r^2_c}{2r_1dr}\]</math> || Exit area to primary area ratio
|align="center"|<math>\gamma = \frac{A_e}{A_1} = \frac{r^2_c}{2r_1dr}</math> ||align="center"|Exit area to primary area ratio
|-
|-
|Governing || <math>\[Re = \frac{2U_2^r_2}{V}\]</math> || Reynolds Number
|align="center" rowspan="2"|Governing Non-Dimensional Parameters (GNDPs)||align="center"| <math>\text{Re} = \frac{2U_2 r_2}{\nu}</math> ||align="center"|Reynolds Number
|-
|-
|Non-Diamensional Parameters (GNDP) || <math>\[C_t = \frac{1 + \beta}{\sqrt{Y(1 + a^2\beta)}}\]</math> || Craya-Curtet number
|align="center"|<math>C_t = \frac{1 + \beta}{\sqrt{\gamma(1 + a^2\beta)}}</math> ||align="center"|Craya-Curtet number
|}
|}




Table 2: Different parameters of the AC.
 




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Latest revision as of 15:33, 11 February 2017

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Confined double annular jet

Application Challenge 2-07 © copyright ERCOFTAC 2004


Introduction

The Application Challenge TA 2 - AC 7, "Confined Double Annular Jet" proposed by the VUB, Belgium, is an axisymmetric double annular flow field generated by a burner, and discharging into a confined combustion chamber (see Fig. 1 below). The flow is studied in cold conditions, and in a nozzle region going from the nozzle to 1.5 diameters downstream. The resulting mean flow is axisymmetric ; it can be qualified as a complex turbulent flow. The flow possesses a central vortex and two small toroidal contra rotating vortices. There are stagnation points and lines, mixing regions and recirculation regions (see Fig. 2 below). This is thus a good AC, since there is a relatively simple geometry (axisymmetric), and the ability of CFD codes to reproduce several properties of complex flows can be tested.

Image150.gif



Figure 1: An overall display of the facility. Inlet arrangement, a cut on the burner, and the combustion chamber are shown. The nozzle region corresponding to the measurements is indicated.


The available experiments are the following:

Experimental data #1: Air flow with a 156 mm largest diameter jet, with a maximum velocity of 6.3 m/s, corresponding to a Reynolds number of 6 104. For this flow, 2D LDV data have been recorded, providing axial and radial mean velocities, axial and radial turbulence intensities and Reynolds stress. The data are provided on a dense experimental grid composed of 36 sections, each of which possessing 100 to 200 measurement points.

Experimental data #2: The flow field, generated in the combustion chamber model by water flow through the model, is measured with a 2D2C PIV system. A total of 271 instantaneous vector fields, each containing 5040 vectors in the near nozzle region, are presented. The flow rate through the burner was 4.09x10-5 m3/s giving a Reynolds number 180, based on nozzle opening dr (2 mm) and mean exit velocity Ue (0.09 m/s). This produces a central toroidal vortex in the transitional state.


Relevance to Industrial Sector

Industrial devices in fluid engineering quite often involve complex turbulent flows. This is the case for example in turbine engines, industrial furnaces, combustors and burners. Industrial burners are designed to generate stationary combustion in a confined chamber, with desired values of velocity, temperature and species concentrations at the exit of the combustion chamber. In general, they consist of several nozzles arranged around an axis in a confined space. The fuel and the oxidizer (usually air) issue out of the nozzles and these jets mix by turbulent diffusion. Burners are often installed to destroy pollutants gases resulting from industrial activities, before releasing them in the atmosphere.

Since international norms in matter of pollution are getting more and more binding, it is important to be able to modify the burner in order to minimize the emission of pollutant species. Since burners are usually designed and modified empirically by the manufacturer, the modifications cannot be optimal. It is therefore important to be able to better understand the flow field and the combustion process associated to burners. The turbulent diffusion of species is faster than the combustion process, so that the first step to understand a burner is to study the flow field in cold conditions. It is essential to understand the behavior of the various jets and their interaction with the neighboring jets and surrounding flows to successfully predict the performance of the device.

The test case provided here contains a complete database in axisymmetric conditions, providing the mean velocity field, turbulence intensity, Reynolds stress components, corresponding to 2 components of the mean velocity and 4 non-zero components of the Reynolds stress tensor. This test-case can thus be used to test the validity of CFD to reproduce the complex flow created by confined annular jets. For the nozzle region (up to 1.5 diameters) this AC is well understood, in terms of data available and overall quality (for experimental data #1, globally less than 2% axisymmetric errors).


Design or Assessment Parameters

The position of some particular points can be used as assessment parameters to judge the validity of CFD computations (more specific comparisons can be done later). Several locations have been selected below, as shown in Figure 2.

Image151.gif


Figure 2: Streamlines of the flow, and designations of specific position points (DOAP).


Flow Geometry

Since the L/D of the channels of the burner are large, the fully-developed flows dominate over any influence from the inlet geometries. Therefore in this AC the geometry is determined only by dimensions of the exit of the burner and of the combustion chamber: see Table 1 and Figure 3 below.

Orientation of axis and sign conventions: since the geometry is axisymmetric, in the following a cylindrical coordinate system is considered (x,z,q), where x is the axial coordinate (the distance from the exit of the burner, along its axis), z is the radial coordinate (the distance from the axis) and q the tangential coordinate, not considered here due to axisymmetry.

Table 1 Definition of Some Geometric Parameters
Parameter Description
r1 radius of the primary jet
r2 radius of the secondary jet
dr width of annular jets
rc radius of the combustion chamber
secondary to primary radius ratio
exit area to primary area ratio



Image152.gif


Figure 3: The diameters of the boundaries of the streams produced by the burner.

Flow Physics and Fluid Dynamics Data

The mean flow is axisymmetric. Only the flow in the nozzle region has been recorded. For this region, the jet presents a complex flow: it possesses recirculation regions, several toroidal vortices, a stagnation point and stagnation lines. First the primary and secondary streams merge, creating a vortex bubble between them. This bubble corresponds to a pair of contrarotating toroidal vortices. Then the simple annular stream becomes a central jet, creating a big central vortex bubble. This central vortex is less stable than the toroidal one (see the streamlines in Figure 2).

The databases correspond to a turbulent, incompressible, isothermal flow with recirculation.

The following tables provide different informations characterizing the flow: The Problem Definition Parameters (PDP) are dimensional quantities characterizing the experiment, and Governing Non-Dimensional Parameters (GNDP) are non-dimensional numbers governing and characterizing the physics of the flow.

First, some useful fluid dynamics parameters are presented in Table 2. The PDP introduced here characterize the geometry of the burner, and determine the inflow (through the velocity ratio of primary to secondary bulk velocity). They are also presented in Table 2.

The GNDP are the Reynolds number and the Craya-Curtet numbers, presented in Table 2. The Reynolds number is defined using the bulk-averaged velocity of the secondary jet and its diameter. The Craya-Curtet number characterizes the recirculation of confined jet flows. It was shown experimentally for some simple annular jet flows that the flow and mixing properties of the classical axisymmetric confined jet depend only on the Craya-Curtet number. It is assumed here that this number is also governing the physics of the double annular jet flow. The Craya-Curtet number can be defined as a normalization of the stagnation pressure loss in the system:



where the different parameters in this equation are defined in Table 2. A small value of the Craya-Curtet number corresponds to large static pressure loss, indicating recirculation.


Table 2 Different Parameters of the AC
Parameter Symbol Definition
Fluid Dynamic Parameters U1 Bulk average velocity of the primary jet
U2 Bulk average velocity of the secondary jet
Ue Bulk average velocity of the average stream
Stagnation pressure loss in the system (difference between exit and entrance stagnation pressure)
ρ Density
Problem Definition Parameters (PDPs) Secondary to primary bulk-average velocity ratio
Secondary to primary radius ratio
Exit area to primary area ratio
Governing Non-Dimensional Parameters (GNDPs) Reynolds Number
Craya-Curtet number



© copyright ERCOFTAC 2004


Contributors: Charles Hirsch; Francois G. Schmitt - Vrije Universiteit Brussel

Site Design and Implementation: Atkins and UniS


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