Spectral Modeling and Numerical Simulation of Compressible Homogeneous Sheared Turbulence

© 2012 Riahi and Lili, licensee InTech. This is an open access chapter distributed under the terms of the Creative Commons Attribution License (http://creativecommons.org/licenses/by/3.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. Spectral Modeling and Numerical Simulation of Compressible Homogeneous Sheared Turbulence


Introduction
This chapter is mainly in the area of the use of Rapid Distortion Theory (RDT) to clarify and to well better increase our understanding of the physics of the compressible turbulent flows. This theory is a computationally viable option for examining linear compressible flow physics in the absence of inertial effects. In this linear limit, the statistical evolution of incompressible homogeneous turbulence can be described completely in terms of closed spectral covariance equations (see Refs. (Hunt, 1990& Savill, 1987 and references therein). Many papers in literature deal with homogeneous compressible turbulence and RDT solution Coleman & Mansour, 1991;Blaisdell et al., 1993Blaisdell et al., , 1996Durbin & Zeman, 1992;Jacquin et al., 1993;Livescu & Madnia, 2004;Riahi et al., 2007;Riahi, 2008;Riahi & Lili, 2011;Sarkar, 1995;Simone, 1995;Simone et al., 1997). These studies have yielded very valuable physical insight and closure model suggestions. In all the above works, the fluctuation equations are solved directly to infer turbulence physics. For the case of viscous compressible homogeneous shear flow in the RDT limit no analytical solutions are known. Simone et al. (1997) performed RDT simulations of homogeneous shear flow and showed that the role of the distortion Mach number, Md, on the time variation of the turbulent kinetic energy is consistent with that found in the direct numerical simulation (DNS) results. In this chapter, numerical solutions to the RDT equations for the special case of mean shear is described completely by finding numerical solutions obtained by solving linear double point correlations equations. Numerical integration of these equations is carried out using a second-order simple and accurate scheme (Riahi & Lili, 2011). Indeed, this numerical method is proved more stable and faster than the previous one which use linear transfer matrix (Riahi et al., 2007& Riahi, 2008 and allows in particular to obtain accurately the asymptotic behavior of the turbulence parameters (for large values of the non-dimensional times St) characteristic of equilibrium states. To perform this work, RDT code solving linearized equations for compressible homogeneous shear flows is validated by comparing RDT results to those of direct numerical simulation (DNS) of Simone et al. (1997) and Sarkar (1995) for various values of initial gradient Mach number Mg0 (Riahi & Lili, 2011).
A study of compressibility effects on structure and evolution of a sheared homogeneous turbulent flow is carried out using this theory (RDT). An analysis of the behavior of different terms appearing in the turbulent kinetic energy and the Reynolds stress equations permit to well identify compressibility effects which allow us to analyze performance of the compressible model of Fujiwara and Arakawa concerning the pressure-dilatation correlation (Riahi et al., 2007). The evaluation of this model stays in the field of RDT validity (Riahi & Lili, 2011).
Equilibrium states of homogeneous compressible turbulence subjected to rapid shear can be studied using rapid distortion theory (RDT) for large values of St (St > 10) in particular for large values of the initial gradient Mach number Mg0 describing various regimes of flow. In fact, the study of the behavior of the non-dimensional turbulent kinetic energy q 2 (t)/q 2 (0) (Riahi et al., 2007). The pressure-released regime is related to infinite values of Mg0 (Riahi & Lili, 2011). The gradient Mach number Mg appears naturally when scaling the (linearized) RDT equations for homogeneous compressible turbulence (see equations (A.10), (A.11), (A.12) and (A.13) in appendix (Riahi et al., 2007)). This parameter can be viewed as the ratio of an acoustic time a l τ a  for a large eddy to the mean Sl τ a  , where l is an integral lengthscale and a is the mean sound speed. The lengthscale of energetic structure is expressed by , where ε is the rate of turbulent kinetic energy dissipation. Sarkar (1995) also used Sl a (which he referred to as 'gradient Mach number' Mg), to quantify compressibility effects for homogeneous shear flow.
In the case of shear flow, l is chosen to be the integral lengthscale of the streamwise fluctuating velocity in the shearing direction x2. Another Mach number relevant to homogeneous shear flow and that characterize the effects of compressibility on turbulence is the turbulent Mach number Mt = u/a based on a characteristic fluctuation velocity u and mean sound speed a.

RDT equations for compressible homogeneous turbulence
The flow to be considered is a homogeneous, compressible turbulent shear flow where we retain the same RDT equations adopted by Simone (1995), Simone et al. (1997), Riahi et al. (2007) and Riahi (2008). The linearized equations of continuity, momentum and entropy controlling the fluctuating of velocity ui and pressure p lead to general RDT equations: where γ is the ratio of specific heats, ρ is the mean density and ν is the kinematic viscosity.
The dot superscript denotes a substantial derivative along the mean flow trajectories related to mean field velocity i U .
Equation (1) is derived from continuity equation and leads to equation (1). So, the isentropic hypothesis 0 s   simplifies governing equations by keeping the variables ui and p and eliminating ρ . We can obviously discard the hypothesis 0 s   by writing the (exact) energy equation. The linearized derived equation within the framework of RDT can be written as pressure fluctuation equation which contains some viscous terms (Livescu et al., 2004; see equation (8)). Such an equation is compatible with equation (2)  . During the period of the turbulence establishment (for early times), the evolution of n with St depends on initial conditions (and in particular of initial entropy fluctuations). However, for all of their simulations and for large values of St, n tends toward an equilibrium value independent of initial conditions and slightly less than 14 γ .
 . Blaisdell et al. (1993) concluded that thermodynamic variables "follow a nearly isentropic process" for large values of St and for compressible sheared turbulence. As a conclusion, we retain that with isentropic fluctuations hypothesis, we can obtained a good prediction of equilibrium states (St )  for compressible homogeneous sheared turbulence.
After these remarks, we consider the Fourier transform (denoted here by the symbol ˆ " " ) of various terms in equations (1) and (2) which leads to the following equations expressed in the spectral space and in the case of turbulent shear flow: where ij λ is the mean velocity gradient defined by: and I 2 = -1.
In the Fourier space, velocity field is decomposed on solenoidal and dilatational contributions by adopting a local reference mark of Craya : are the solenoidal contributions and 3 (k,t)   is the dilatational contribution.
By separating solenoidal and dilatational contributions, we introduce the spectrums of doubles correlations: where 4 () k,t   is related to the pressure and takes the following form: We then write evolution equations of these doubles correlations:   Numerical integration of these equations ((11)-(20)) is carried out using a simple secondorder accurate scheme: where the derivatives f'(t) and f''(t) are expressed exactly from evolution equations (11)-(20) and Δt is the time-step size.

Introduction
In this section, results are presented and used to verify the validity of the RDT code. For this, tests of this code have been performed by comparing RDT results with those of direct numerical simulation (DNS) of Simone et al. (1997) for various values of initial gradient Mach number Mg0 which describe different regimes of the flow (see below). Comparisons concern the turbulent kinetic energy q 2 (t)/q 2 (0) (1981) have shown that in the incompressible homogeneous shear flow 12 b tends toward an equilibrium value which is independent of initial conditions.
Concerning the existence of the evolution zones where shocks develop, we neither observe any anomaly in physic parameters (no problem of realisability), nor any instability in the calculation course. In addition, it is important to specify that our code was not conceived to take explicitly into account the existence of shocks. However, we think that in the applications presented, the flow is not probably contaminated by the appearance of shocks.

Initial parameters
Intrinsic parameters that characterize the flow include the initial turbulent Mach number  In these cases, the initial turbulent kinetic energy spectrum is similar to that used by Simone (1995), where κpic denotes the wave number corresponding to the peak of the power spectrum and K is the initial wave number.

Results and discussion
All Figures 1-8 validate RDT approach and numerical code for low values of the nondimensional times St (until 3.5). Indeed, comparisons carried out between our RDT results (Riahi & Lili, 2011) and DNS results of Simone et al. (1997) show that the linear analysis predicted correctly -as well qualitatively as quantitatively -the behavior of turbulence in particular for small values of St.        Simone et al. (1997) indicate, as general conclusion that compressibility effects on homogeneous sheared turbulence, concerning particularly b12 and the non-dimensional production, which are generally associated with non linear phenomena, can be explained in terms of RDT. So, non linear and dissipative effects (through the non linear cascade) are not significant for predicting equilibrium states for strongly compressible regime (Simone et al., 1997). Consequently, we can justify the resort to RDT in order to determine equilibrium states in the compressible regime.
In Figures 9-11, we present evolutions of b12 (which is linked to production), b11 and b22 components anisotropy tensor in the incompressible (Mg0 = 2.2) and intermediate regimes (Mg0 = 13.2). In the incompressible regime, as illustrated in Figures 9(a), 10(a), 11(a), we confirm that RDT validity is limited for small values of St; considerable differences appear between RDT and DNS results of Sarkar (1995) beyond. With RDT, it is not possible to predict evolution of sheared turbulence for large values of St. Consequently, we can't predict, by means of RDT, equilibrium states of sheared turbulence in the incompressible regime. We note that in the intermediate regime [Figs. 9(b), 10(b), 11(b)], the behavior of DNS results of Sarkar (1995)      In conclusion, RDT is valid for small values of the non-dimensional times St (St < 3.5). RDT is also valid for large values of St (St > 10) in particular for large values of Mg0. This essential feature justifies the resort to RDT in order to critically study equilibrium states in the compressible regime.

Various regimes of flow
The various curves of Figure 1(b) permit to determine different regimes of the flow (Riahi & Lili, 2011). This figure shows that there is an increase in the turbulent kinetic energy when Mg0 increases for various cases considered A1,…,A10. In addition, when initial gradient Mach number increases, we observe a break of slope which is accentuated when the value of Mg0 becomes more significant. It appears from this figure that the turbulent kinetic energy varies quasi-linearly in cases A1 and A2, where Mg0 takes respectively values 2.7 and 4. These two values of Mg0 correspond to the incompressible regime. A weak amplification of the turbulent kinetic energy shows that cases A4 (Mg0 = 12) and A10 (Mg0 = 66.7) correspond to the intermediate regime. From Mg0 = 16.5, the regime becomes compressible. Indeed, cases A5,…, A10 show a significant amplification of the total kinetic energy more and more marked when the initial gradient Mach number Mg0 increases.
These different regimes permit to better understanding compressibility effects on structure of homogeneous sheared turbulence and to analyze the causes of turbulence structure modification generated by compressibility.
Several explanations were proposed these last years to analyze causes of the stabilising effect of compressibility which are still not cleared up.

Introduction
The study of compressibility effects on the turbulent homogeneous shear flow behavior made these last years the objective of several researches as mentioned in the works of Blaisdell et al. (1993Blaisdell et al. ( & 1996 and Sarkar et al. (1991Sarkar et al. ( & 1992. DNS developed by Sarkar (1995) show that the temporal growth rate of the turbulent kinetic energy is extensively influenced by compressibility. Simone et al. (1997) identified the new coupling term in the quasiisentropic RDT equations, which was responsible for long-term stabilization, comparing incompressible and compressible RDT. They concluded that the modification of the compressible turbulence structure is due to linear processes.
The prediction of compressible turbulent flows by rapid distortion theory provides useful results which can be used to clarify the physics of the compressible turbulent flows and to study compressibility effects on structure of homogeneous sheared turbulence. This study is important for the analysis of various physical mechanisms which characteristic the turbulence. Thus, physical comprehension of compressibility effects on turbulence leads it possible to better predict compressible turbulent flows and to improve existing turbulence models. The Helmoltz decomposition of the velocity field in solenoidal and dilatational parts reveals two additional terms in the turbulent kinetic energy budget. Several studies of the behavior of the different terms present in this budget and the Reynolds stress equations show the role of the explicit compressible terms. From Simone et al. (1997) and Sarkar (1995), for the case in which the rate of shear is much larger than the rate of non-linear interactions of the turbulence, amplification of turbulent kinetic energy by the mean shear caused by compressibility is due to the implicit pressure-strain correlations effects and to the anisotropy of the Reynolds stress tensor. These authors also recommend to take into account correctly the explicit dilatational terms such as the pressure-dilatation correlation and the dilatational dissipation. In contrast, the role of explicit terms was over-estimated by Zeman (1990) and Sarkar et al. (1991). These last authors show that both those terms have a dissipative contribution in shear flow, leading to the reduced growth of the turbulent kinetic energy.
The study of the budget behaviors of the turbulent kinetic energy and the Reynolds stress anisotropy by RDT enables to better understand and explain compressibility effects on structure and evolution of a sheared homogeneous turbulence.

The turbulent kinetic energy equation
In the case of homogeneous turbulence, the turbulent kinetic energy is written (Simone, 1995)  εν ω ω ε ν uu  are respectively the solenoidal and the dilatational parts of the turbulent dissipation rate given that i ω is the fluctuating vorticity and i,i u denotes the fluctuating divergence of velocity. s ε represents the turbulent dissipation arising from the traditional energy cascade which is solenoidal, d ε represents the turbulent dissipation arising from dilatational regimes. Note that the last two terms on the right-hand sid e in equation (22) do not appear when the flow is incompressible. The explicit/energetic approach is embodied in the modeling of d ε and Π d done by Zeman (1990), Sarkar et al. (1991) and others.

Results
Figures 12(a), (b), (c) show the budget of the turbulent kinetic energy for three values of initial gradient Mach number (respectively 1, 12 and 66.7) which describe the various regimes of the flow (Riahi & Lili, 2011). It will be shown from Figures 12(b), (c) that the production P and the pressure-dilatation Π d intervene significantly in this budget. In the compressible regime [ Fig. 12(c)], the production is dominating and the pressure-dilatation Π d remains with relatively low values (practically null until St = 1). Figure 12(a) shows the results for Mg0 = 1 and Mt0 = 0.1 (case A0). In this case, it is still the production which is dominating. The explicitly compressible terms which are the dilatational dissipation rate d ε and the pressure-dilatation Π d are not negligible in spite of the small value of the initial gradient Mach number Mg0. Consequently, we can affirm that ''the incompressible behavior'' cannot be obtained in the borderline case of low values of Mg0; that's why we preferred to give the results for Mg0 = 1 and not for Mg0 = 2.7 and 4 with an aim of better approaching the ''incompressible limit''. In conclusion, compressibility affects more the turbulent production term which represents the dominating parameter in the turbulent kinetic energy budget. In the compressible regime, the production becomes preponderant. This property is already observed in the analysis of the budget of the Reynolds stress equations related to 2 1 u and 12 uu (Riahi et al., 2007).
In Figures 13(a)

Equilibrium states of homogeneous compressible turbulence
RDT is also used to determine equilibrium states in the compressible regime (Riahi & Lili, 2011) in particular for large values of St (St > 10) and Mg0. Evolution of the relevant component of Reynolds stress anisotropy tensor b12 is presented in Figure 14 for different values of the initial gradient Mach number Mg0 (66.7, 200, 500 and 1000). Numerical results show that, for large values of St, b12 is independent of the initial turbulent Mach number Mt0 as shown in Figure 14(a) (Mt0 = 0.25) and in Figure 14(b) (Mt0 = 0.6). As one can remark also from these results that b12 reaches its stationary value all the more quickly as Mg0 is large (Mg0 = 1000). At this stage, we study equilibrium states corresponding to Mg0 = 1000, value which we assimilate to Mg0 arbitrarily large (Mg0 infinity). We present now some properties relative to these equilibrium states corresponding to pressure-released regime. The case corresponding to pressure-released limit has been discussed by Cambon et al. (1993), Simone et al. (1997) and Livescu et al. (2004). We begin by presenting equilibrium values of Another interesting property of the pressure-released regime is the quadratic increase of 2 1 u as shown in Figure 15 related to Mg0 = 10 6 and Mt0 = 0.25 (Riahi & Lili, 2011). This property has been established by Livescu et al. (2004) as analytical RDT solution in the pressurereleased limit.

Introduction
RDT is an efficient and accurate method for testing linear turbulence models. The Fujiwara and Arakawa model (1995) has been proposed in literature for pressure-dilatation correlation studying compressible turbulence. In order to verify its capacity to describe the homogeneous compressible flow, since it was established to this objective, three cases of the initial gradient Mach number (Mg0 = 1, 12 and 66.7) are considered. The evaluation of this model, in the different regimes of flow, stays in the field of RDT validity (Riahi & Lili, 2011). Its detailed linear form is provided below.

Fujiwara and Arakawa model
The model suggested by Fujiwara and Arakawa (1995) for the pressure-dilatation correlation takes into account the compressible part (dilatational) of the kinetic energy ( 2 d q ).
Linear part of this model has the following form: where 1 03 C.  and ε is the turbulent dissipation rate. ij b is the Reynolds anisotropy tensor.

Results
Comparison between RDT and Fujiwara and Arakawa (1995)

Conclusion
Rapid distortion theory (RDT) is a computationally viable option for examining linear compressible flow physics in the absence of inertial effects. Evolution of compressible homogeneous turbulence has been described completely by finding numerical solutions obtained by solving linear double correlations spectra evolution. Numerical integration of these equations has been carried out using a second-order simple and accurate scheme. This numerical method has proved more stable and faster and allows in particular to obtain accurately the asymptotic behavior of the turbulence parameters (for large values of St) characteristic of equilibrium states. In this chapter, RDT code developed by authors solves linearized equations for compressible homogeneous shear flows (Riahi & Lili, 2011). It has been validated by comparing RDT results with direct numerical simulation (DNS) of Simone et al. (1997) and Sarkar (1995) for various values of initial gradient Mach number Mg0 which is the key parameter controlling the level of compressibility. The study of the behavior of the non-dimensional turbulent kinetic energy q 2 (t)/q 2 (0) permit to determine various regimes of flow. This study allows to check relevance of an incompressible regime for low values of initial gradient Mach number Mg0, of an intermediate regime for moderate values of Mg0 and of a compressible regime for high values of Mg0. Agreement between RDT and DNS of Simone et al. (1997) and Sarkar (1995) is obtained for small values of the non-dimensional times St (St < 3.5). This agreement gives new insight into compressibility effects and reveals the extent to which linear processes are responsible for modifying the structure of compressible turbulence. The behavior analysis of the various terms presented in the turbulent kinetic energy budget shows that compressibility affects more the turbulent production which becomes preponderant in the compressible regime. This property is already observed in the analysis of In conclusion, after a critical analysis, we were able to justify that RDT permits to well identify compressibility effects in order to develop models taking them into account satisfactorily. The analysis of rapid distortion theory showed that it is possible to better understand the compressible turbulent flows. In addition, RDT is valid to predict asymptotic equilibrium states for compressible homogeneous sheared turbulence for large values of initial gradient Mach number (pressure-released regime). RDT is an efficient method for testing linear contribution of turbulence models.