Thanks for the videos. I have learnt a lot from your videos. I have a request. Can you please do symbolic linear stability analysis of lorenz equations (deterministic non periodic flow-1963). Most of linear stability analysis examples are numerical using numpy and scipy packages. It will be interesting to do using sympy and hence this request.
Nicely done. Will you be making videos for this using deSolve in R? Or maybe OpenCL2? I saw it done in cuda cores. OpenCL would be of more interest since community drivers would still be kicking about in AMD for when Wayland (over X11, in Linux, etc.) becomes more likely a standard. How about SciLab? DeSolve and CRAN r-project? So like GTK4 and up would do. Essentially... in stuff that doesn't cost anything. Question applies to Ordinary Differential Equations (ODE), Partial Differential Equations (PDE), Differential Algebraic Equations (DAE) and delay differential equations (DDE). I'm asking so as to be able to help other people with the body of knowledge while trying to keep FOSS options available. Fedora-scientific-spin distro version 36 is just out (fitting nicely onto a 4.2Gb DVD ISO). Also Geogebra on skole-linux is handy. That book new is £161 in the British Isles (Amazon) BTW. That's like $200USD. My comment has no hate in it and I do no harm. I am not appalled or afraid, boasting or envying or complaining... Just saying. Psalms23: Giving thanks and praise to the Lord and peace and love. Also, I'd say Matthew6.
I did the bonus question and according to my computation the maximum number of people which are in the hospital is 64,703 and this peak is reached after 40 days. Can someone confirm that result?
I added an hospitalisation quantity, H, so that dH/dt = 0.05 * dR/dt - H / 3 and got Hmax = 61135.4055534637 at day 41. How did you obtain your result?