If we calculate the torque about A then we can use:
τ = Iₐα
to calculate the angular acceleration about A, where Iₐ is the moment of inertia about A. We can can use the parallel axis theorem to find Iₐ

In this case we are considering the rotation of the cylinder about the point A, so Iₐ is the MOI of the cylinder about a point on its circumference:
Iₐ = ¹⁄₂mR² + mR²
Yes?

And the force of static friction Fₛ pointing up the ramp.
Yes?

So the net force down the ramp is:
Fₙ = mg sinθ - Fₛ

And we can substitute Fₙ = ma to get:
ma = mg sinθ - Fₛ

Point (b) : $fR = I \alpha$
Where $\alpha = \frac{a}{R}$
$fR = \frac{mR^2}{2} \cdot \frac{a}{R}$
$f = \frac{ma}{2}$
Now I write the force diagram
On the x axis : $-f + mg\sin(\theta) = ma$
On the y axis: $N = mg cos(\theta)$
So : $-\frac{ma}{2} + mgsin(\theta) = ma$
$a = \frac{2}{3}g \sin(\theta)$
$f = f_s = \mu_s \cdot N$
But : $f = \frac{ma}{2}$
$\mu_s mg \cos(\theta) = \frac{ma}{2}$
$\mu_s = \frac{ma}{2(mg\cos(\theta))}$

So the torque is:
τ = mgRsinθ

So we get:
α = τ/I = mgRsinθ / ³⁄₂mR² = ²⁄₃g sinθ/R

So if the frictional force was non-zero that would mean there must be a non-zero horizontal force so the cylinder must be accelerating or decelerating.
And that must mean its KE is changing.
And that must mean something is doing work on it.
Yes?

@JohnRennie Please have a look at this : https://datascience.stackexchange.com/questions/129754/daily-balance-prediction-using-lstm-arima?noredirect=1#comment128372_129754
Any ideas on how to increase the prediction accuracy?