2022
DOI: 10.1017/jfm.2022.608
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Experimental observations on turbulent boundary layers subjected to a step change in surface roughness

Abstract: Based on experimental data acquired with particle image velocimetry, we examine turbulent boundary layers that are subjected to an abrupt change in wall roughness in the streamwise direction. Three different sandpapers (P24, P36 and P60) together with a smooth wall are used to form a number of different surface transition cases, including both R  $\rightarrow$  S (where upstream surface is rough and second surface is either smooth or smoother compared with the upstream surface) and S … Show more

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Cited by 10 publications
(8 citation statements)
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“…Consistently, n ≈ 0.8 was also reported for cases of S → R or R 1 → R 2 (where R 1 stands for a rough upstream surface smoother than the rough downstream surface R 2 ) by Andreopoulos and Wood (1982), Efros and Krogstad (2011) and Gul and Ganapathisubramani (2022) in the laboratory where the downstream surfaces are constructed using sandpaper or recessed elements, and by Rouhi et al (2019) where the downstream rough surface is a sine function. Much smaller values of the exponent (0.21 < n < 0.5) have, however, been observed in other S → R or R 1 → R 2 scenarios when the roughness elements were raised.…”
Section: Introductionsupporting
confidence: 68%
“…Consistently, n ≈ 0.8 was also reported for cases of S → R or R 1 → R 2 (where R 1 stands for a rough upstream surface smoother than the rough downstream surface R 2 ) by Andreopoulos and Wood (1982), Efros and Krogstad (2011) and Gul and Ganapathisubramani (2022) in the laboratory where the downstream surfaces are constructed using sandpaper or recessed elements, and by Rouhi et al (2019) where the downstream rough surface is a sine function. Much smaller values of the exponent (0.21 < n < 0.5) have, however, been observed in other S → R or R 1 → R 2 scenarios when the roughness elements were raised.…”
Section: Introductionsupporting
confidence: 68%
“…Two different methodologies were employed to determine the friction velocity as it responds to the change in roughness. The first methodology, based on the model in Elliott (1958), has been widely used to determine the response of the wall shear stress to a roughness change (Gul & Ganapathisubramani 2022;Li et al 2022). This model assumes that the flow within the IBL reaches equilibrium promptly, hence there is a constant roughness length of the downstream surface z 02 , while the mean streamwise velocity assumes the form of a piecewise function…”
Section: Roughness Length and Friction Velocity Determinationmentioning
confidence: 99%
“…The power exponent n varies within the range of [0.2, 0.8] in the existing literature, and it is dependent on the roughness arrangement and sensitive to the estimation procedure. The approaches to identify the IBL can be categorised into two branches according to the variables of interest, which are the mean streamwise velocity (Elliott 1958;Antonia & Luxton 1971a;Cheng & Castro 2002;Gul & Ganapathisubramani 2022) and normal stress (Efros & Krogstad 2011;Li et al 2021). Thus, recent work applied distinctive identification procedures to compare the growth curves of IBLs (see Rouhi, Chung & Hutchins (2019), Bou-Zeid, Meneveau & Parlange (2004), Sessa, Xie & Herring (2018) and Li et al (2021) amongst others).…”
Section: Introductionmentioning
confidence: 99%
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“…Several experiments have been reported recently (Hanson and Ganapathisubramani 2016;Li et al 2019Li et al , 2021Gul and Ganapathisubramani 2022) that are mostly in the engineering domain. These studies have focused on the one-and two-dimensional turbulent spectra and on the integral and smaller length scales in the flow field behind an abrupt roughness transition.…”
Section: Introductionmentioning
confidence: 99%