Let $f(x)$ be a positive function on $[0,\infty)$ such that $f(x) \leq 100 x^2$. I want to bound $f(x) - f(x-1)$ from above. Of course, we have $f(x) - f(x-1) \leq f(x) \leq 100 x^2.$ This is not good for me though. I need a bound which is linear (or at worst linear-times-root) in $x$.
Is there an inequality of the form $f(x) - f(x-1) \leq f^\prime (x)=200 x$?