Can a system with a response Y(x) = ax + c be called linear?

Question

I made a DC-DC converter its ideal transfer function is: $$ V_0(D) = DV_i $$

I took measurements of its response and then made a linear regression, I got this result:

$$ V_0(D) = 0.98DV_i -0.42 $$

Quite similar to the expected value. Now, can I say that the system has a linear response?

strictly speaking, the system response should be zero when the input is zero, but in this case, if D = 0:

$$ V_0 = -0.42 $$

What would be the correct way to refer at the response of this system?

Edit:

Here is a plot of the theoric response, red, vs experimental values green. The 0.42 basically represents an offset because the losses of the system.

Answer 1

Well, I wouldn't say the result is quite similar, I don't have any information on scale or units of measurement but the $-0.42$ value might be significant. You should analyze other data, such as the correlation factor, and decide if the linear model you use to regress the data is appropriate.

To answer your question: no. I think that, based only on what you have presented, you cannot conclude your system has a linear response. You should try to fit other models to prove they don't fit as well as a linear one and also present some more data. That doesn't mean it's not linear though only that you need to do some more analysis before concluding that.

EDIT: By the way, if a system does have a $Y(x) = ax + c$ response it is by definition linear, I think your question is whether your system does have such a response.