Hi everyone! If you have any questions on what I cover in this video (or general comments you'd like me to see), please leave them on this comment so that I get notified. Thanks for watching. Cheers!
It would be very interesting in my opinion to see you tackle the set-up of a state-space model for a system, other than a linear spring for which there are quite some examples to be found.
Hi Brian, thank you for a great series. I'm interesting in linearization through fitting a model. I watch your system identification and sumo bot example in your channel. With my current understanding of control and Matlab, I couldn't understand the process completely. Like how do you pass impulse, step function , or ramp into your sumo bot (C++ coding wise) . Do you have other resources that could help us understand linearization through fitting model? Thanks in advanced!
at 3:09 if we plot system output with plot(0.8*step(linsys1)) unfortunately output is stable at 8 instead of 4. There is a problem with this linearization but I couldn't found it.
Hi Brian, I love your videos. I am trying to linearize the kinematics bicycle model for my maths university dissertation surrounding the control theory of autonomous cars. I am really struggling with this. I was wondering whether you might be able to help me? I would be more than happy to discuss over email if you were willing to help. Thank you, Fleur
at 3:09 if we plot system output with plot(0.8*step(linsys1)) unfortunately output is stable at 8 instead of 4. There is a problem with this linearization but I couldn't found it.
Thanks Brian for the awesome videos. I have faced an interesting problem. My linear model derived by hand contains a pole at origin and according to local stabiliy theorem we cannot conclude anything about the stability of equilibrium point by using linearization. It turns out this is exactly the case as when I plot the eigenvalues of the system, I see difference between the damping of dominant poles and the time-domain simulation. However, when I use linmod, the obtained linear model correctly represents the dynamic behavior of the nonlinear model around the operating point as verified by simulation results. I was wondering where this difference between my linearization and linmod comes from. Is it because of that block-by-block linearization? Can we say that the method always results in exact linearization without error? The linmod model contains no eigenvalues with zero real parts, is it going to be always the case?
Hi everyone! If you have any questions on what I cover in this video (or general comments you'd like me to see), please leave them on this comment so that I get notified. Thanks for watching. Cheers!
Thank you very much Dr Brian
It would be very interesting in my opinion to see you tackle the set-up of a state-space model for a system, other than a linear spring for which there are quite some examples to be found.
Hi Brian, thank you for a great series. I'm interesting in linearization through fitting a model. I watch your system identification and sumo bot example in your channel. With my current understanding of control and Matlab, I couldn't understand the process completely. Like how do you pass impulse, step function , or ramp into your sumo bot (C++ coding wise) . Do you have other resources that could help us understand linearization through fitting model?
Thanks in advanced!
at 3:09 if we plot system output with plot(0.8*step(linsys1)) unfortunately output is stable at 8 instead of 4. There is a problem with this linearization but I couldn't found it.
Hi Brian, I love your videos. I am trying to linearize the kinematics bicycle model for my maths university dissertation surrounding the control theory of autonomous cars. I am really struggling with this. I was wondering whether you might be able to help me? I would be more than happy to discuss over email if you were willing to help. Thank you, Fleur
Great video. I couldnt find the link to the aircraft trimming example. Is it from Christopher Lum?
First class material!!!!
At 2:03 what did you do to get the (+) on top of line-input? And what does this add for the model?
Great videos, Cheers
at 3:09 if we plot system output with plot(0.8*step(linsys1)) unfortunately output is stable at 8 instead of 4. There is a problem with this linearization but I couldn't found it.
hi how did you get the -a/(4*A) from? In the previous step, it was -a/A*1/(2*sqrt(hbar)).
How do we know which operating point simulink is linearizing about?
thanks Dr. Brian, you would do a video upon equation differential of converter DC-AC (it's nonlinear system)...
Excellent work!
The resulting transfer function of the linear system corresponds to the roots, but does not correspond to the gain. Why?
Thanks Brian for the awesome videos. I have faced an interesting problem. My linear model derived by hand contains a pole at origin and according to local stabiliy theorem we cannot conclude anything about the stability of equilibrium point by using linearization. It turns out this is exactly the case as when I plot the eigenvalues of the system, I see difference between the damping of dominant poles and the time-domain simulation. However, when I use linmod, the obtained linear model correctly represents the dynamic behavior of the nonlinear model around the operating point as verified by simulation results. I was wondering where this difference between my linearization and linmod comes from. Is it because of that block-by-block linearization? Can we say that the method always results in exact linearization without error? The linmod model contains no eigenvalues with zero real parts, is it going to be always the case?
I don't know the answer in general. Is your nonlinear model and your linearization by hand simple enough to share and I can take a look?
@@BrianBDouglasYes, it is a system of third order.
best
4 parsec, lol