Let $\mathbb{F}_q$ be a finite field, $\psi$ be a non-trivial additive character over $\mathbb{F}_q$, and $a, b \in \mathbb{F}_q$ constants. Is there any known estimate for the gaussian sum
$$\sum_{x \in \mathbb{F}_q} \psi( a x^m + b x^n),$$
possibly for specific values of $m, n \in \mathbb{Z}_{\ge 2}$, $m \ne n$?
As Ofir Gorodetsky notes in the comments, Weil's bound gives that the absolute value of the sum is most order $\max(m,n) \sqrt{q}$. This is non-trivial as long as $m$ and $n$ are $o(\sqrt{q})$, after this the estimate is worse than the trivial bound.
When $m$ and $n$ are large there are known estimates from additive combinatorics, at least when $q$ is prime. There are some obstructions to estimates, particularly when $m$, $n$ or $m-n$ have a large common factor with $q-1$. Otherwise one can obtain cancellation. See: J. Bourgain's paper "Mordell's Exponential Sum Estimate Revisited".
