Problem

Source: OLCOMA Costa Rica National Olympiad, Final Round, 2019 3.4

Tags: algebra, function, functional equation



Let $g: R \to R$ be a linear function such that $g (1) = 0$. If $f: R \to R$ is a quadratic function such what $g (x^2) = f (x)$ and $f (x + 1) - f (x - 1) = x$ for all $x \in R$. Determine the value of $f (2019)$.