Turbulence: Reynolds Averaged Navier-Stokes (Part 1, Mass Continuity Equation)
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- Опубліковано 1 кві 2021
- One of the most common strategies to model a turbulent fluid flow is to attempt to model the average, or mean flow field, by expanding the velocity field into an average and a fluctuating component. This video introduces this idea of "Reynolds averaging" and shows how to obtain a mass continuity equation for the mean flow.
Citable link for this video: doi.org/10.52843/cassyni.tcxvxy
Check out the excellent notes by Lex Smits: profs.sci.univr.it/~zuccher/do...
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Steve, I love your turbulence videos. Just want to point out that I think you missed a "1/T" multiplying the integral when you calculate the mean velocity.
Yikes, you are very right! I am pinning this comment so it is at the top.
Exactly! I also bugged at that moment. If not dimensions of both sides of equation are not the same.
I was worried I was missing something. hehe
Thank you! I thought I was going insane!
this video should be watched by entire mechanical engineering student who excited in fluid dynamics field. Thank you, SIr!
I'm an aerospace engineering student mostly focused on control engineering and I have to say - although I don't pursue any fluid dynamics anymore - you are the best professor I have seen so far. Your style of teaching is absoluty extraordinary. It's good friday, exams are over and here I am watching your videos out of pure curiosity. Your control videos helped me a lot in my studies but this turbulence series isn't even relevant to my studies but it is sooo interesting. Thank you so much for that!!!
I am astounded by how fluently you are able to write backwards. Incredible lecture!
The video is mirror flipped in post production 😉
Edit: I just realized Steve is actually left handed... I'm dumb
@@oleksiishekhovtsov1564 Thanks ☺☺
@@oleksiishekhovtsov1564 he's joking come on :)
I think it's important to let the general audience know that the derivation begins with the non-dimensionalized form of the incompressible Navier-Stokes and continuity equations. Non-dimensionalization of the continuity equation is less of a concern since it retains its original form but the N-S equation may initially confuse those less familiar with the non-dimensionalized form. Thank you for a great series of videos.
Michael I agree, but still a great video 😍😍
yeah you are right. first we have the implification of reynolds number, that can actually cansel out some terms weather its value is 1, plus the non-dimensiolized navier stoke equation
WHAT have I just seen? is incredible, going right now to the next episode
I've just finished my Master's and this is so much better than any class I had during graduation some 10 years ago. I wish this was available earlier! This serves not only as a refresher, but your ability to summarize a complex topic in a concise video is remarkable, makes it easier to organize the thought process and keep in mind the important ideas while deriving the equations. Thank you!
I work in applied ML research but come from a fluid dynamics background. You have just reminded me how fun this is and I am going to brush up on my vector calculus. Thank you.
One of the best explanation I've ever heard! Thank you for this short and nonetheless informative lecture, Prof. Brunton!
Awaiting for a second part. Great video.
Hi Steve, your videos about fluid and turbulence in general are so interesting and easy to understand. I have been studying for my turbulence course and your contents help me clarify these concepts a lot. Please keep making more of these awesome videos. Cheers!
Cant wait for more! Best content on YT
Steve, I just need to say thank you very much. I just started my thesis on the turbulent boundary layer flow in the Hypersonic regime using a RANS simulation and your videos on Turbulence are really helpful and interesting. I am following these as basically a lecture on RANS as i dont remember anything from when i actually studied them. Thanks a lot
Hi Steve, thanks for all of your CFD videos and how in depth you make them .
Dr. Steve I really love your videos keep explaining this awesome topics
I love this series! great video
Excellent content please keep up the amazing work!
You teach so good that even a 15 year old like me can even understand
Really cool. Thanks for the recap at the end. That was very useful. I'm just trying to get the "big ideas" out of this series, so I appreciate that. Fascinating stuff, no doubt and I'm excited for the next installment.
Well, you gave "zed" and honest go. ;-) I'm sure the international crowd appreciates it.
Great video! It also would be very interesting to learn about ensemble averaging and URANS models for unsteady flows
Just finished a MSME and one of the last things I started studying was turbulent flows. Now I am gearing up to write a proposal for a scholarship and will be applying to come study this with you hopefully Fall 2023 as a PhD student! I will have my ducks in a row - I promise!
this really helps me a lot sir, thank you so much!!
Mod-06 Lec-35 Derivation of the Reynolds -averaged Navier -Stokes equations
your voice make me relaxed
You are the best! Thanks!
It's was amazing thank you!
Thanks for the video
I really like it, Thanks a bunch sir
Steve, can you do a video on moving boundary heat transfer problems?
Hello Prof. Burton, could you please mention what sort of accessories one needs to record such excellent lectures..what are you using?
When saying function of x and t , does this mean that flow is only x dependent concerning space ? Because there is a gradient in y direction in the flow profile as you draw it.
Steve I follow all of your lectures. Being a mechanical engineer I really got amazed by watching your turbulence lectures. I personally worked with CFD using scientific python and visualization and computation using python and published a couple of research articles. I'm very eager to work under your guidance in the field of CFD and Fluid dynamics using Machine learning specifically simulation and modelling turbulence fluid flow field and explore the mysterious world of turbulence. How should I reach you for further communication?
Hello Prof. Steve, can you please clarify my doubt about differentiability of fluctuating velocity term in Reynold's decomposition. It is randomly varying component in space and time ( that's why we are talking about its mean and variance) then how can we define its spatial and temporal derivatives in traditional calculus way?
When you calculate U bar, the contribution of u'(x,t) is included, right ? Then you add u'(x,t) again. Are you double calculationg u'(x,t)? As I see it, U bar should be the time-invariant term, but the integration is along time domain....So I am confused. Could you please explain it?
When you speak of time averages of derivatives, do you meant time averages of spatial derivatives?
The equation that you wrote at 5:12 for U mean, shouldn't be multiplied by 1/T with T being total integration time?
Sorry, I didn't read the comments before writing this one.
When introducing the time averaged by the integration at the beginning, shouldn't it be normalized by T? i.e., 1/T*(the integral)? Otherwise as T goes to infinity, the integral goes to infinity as well.
same comment
May be I am making a mistake but I could not figure out how average of sums is equal to sum of the averages. Instead average of sum is average of the sum of the averages. Let’s say both, u and v, have an average between 0 and 1. The sum can be higher than 1. Whereas if I sum up u and v and then calculate average, it will be below 1. So, bar(u+v) = bar(bar(u) + bar(v))
8:48: Could someone kindly explain to me why the inequality holds? It seems strangely counter-intuitive for me. Thanks in advance:)
Hi Max, just think that overbar is an average so in general the average of the product is not equal to the product of the averages. Simple discrete example: a=[1,3] b=[5,7]. Average a=2…Average b=6 so their product is 12, but instead average ab=(5+21)/2=13
@@giovanniiacobello2866 oh wow, what a brainfart. Thank you for clarifying:)
Not really related to your topic, but as i watched your video, I became mesmerized that for you to write on glass and for me to see it, the letters should be a mirror image. So i started thinking that you are amazing to be able to write in a mirror image. That seems improbable so came up with the thought that the camera is looking at a mirror of you writing on glass.
Am i right?
You can flip the video on your computer
Wow 😁😁😁
Okay good
"IT'S GONNA BE A MESS! ... but kind of fun :)"
Was sat here thinking how impressive it is he can write backwards, until I realised he probably just flipped the video, I'd like to be wrong though!
where is the rho?
rho=const here
wow impressive the ability to write backwards