Arithmetic and Geometric Progressions in Productsets over Finite Fields

Given two sets $\cA, \cB \subseteq \F_q$ of elements of the finite field $\F_q$ of $q$ elements, we show that the productset $$\cA\cB = \{ab | a \in \cA, b \in\cB\}$$ contains an arithmetic progression of length $k \ge 3$ provided that $k<p$, where $p$ is the characteristic of $\F_q$, and # \cA # \cB \ge 3q^{2d-2/k}. We also consider geometric progressions in a shifted productset $\cA\cB +h$, for $f \in \F_q$, and obtain a similar result.