The Classification of Regular Surfaces Isogenous to a Product of Curves with chi(mathcal O_S) = 2

A complex surface $S$ is said to be isogenous to a product if $S$ is a quotient $S=(C_1 \times C_2)/G$ where the $C_i$'s are curves of genus at least two, and $G$ is a finite group acting freely on $C_1 \times C_2$. In this paper we classify all regular surfaces isogenous to a product with $\chi(\mathcal O_S) = 2$ under the assumption that the action of $G$ is unmixed i.e. no element of $G$ exchange the factors of the product $C_1 \times C_2$.