When I was first introduced to the idea of an asymptote, I was taught about horizontal asymptotes (of form $y=a$) and vertical ones ( of form $x=b$).
I was then shown oblique asymptotes-- slanted asymptotes which are not constant (of the form $y=ax+b$).
What happens, though, if we've got a function such as $$f(x)=e^x+\frac{1}{x}?$$
Is $y=e^x$ considered an asymptote in this example?
Another example, just to show you where I'm coming from, is $$g(x)=x^2+\sin(x)$$-- is $y=x^2$ an asymptote in this case?
The reason that I ask is that I don't really see the point in defining oblique asymptotes and not curved ones; surely, if we want to know the behaviour of $y$ as $x \to \infty$, we should include all types of functions as asymptotes.
If asymptotes cannot be curves, then why arbitrarily restrict asymptotes to lines?
