It is well-known that a definable field of finite Morley rank has no proper definable group of automorphisms (a proof can be found for example in the book "[Stable groups](https://doi.org/10.1090/surv/087)" of Poizat). My question is: can something similar be said about morphisms of the additive group $K^+$ that are morphisms of a definable proper infinite subgroup of $K^{\times}$? Clearly we are in a higly pathological situation, indeed the field must be of characteristic $p$ (if not any additive morphism is a product by a scalar and therefore it must be the identity in our case) and a green field (since it must have a proper infinite definable multiplicative subgroup). Green fields of finite characteristic are unlikely to exist but I didn't find a proof of the non-existence of them.