We investigate in the present paper the maximization problem for the L1 norm of the unique positive solution of an heterogeneous Fisher-KPP equation with respect to the growth rate. It is already known that the BV norms of maximizers of this functional blow up when the diffusivity tends to zero. Here, we first show that the maximizers are always BV. Next, we completely characterize the limit of the maximas of this functional as the diffusivity tends to zero, and we show that one can construct a quasi-maximizer which is periodic, in a sense, and with a BV norm behaving like the inverse of the square root of the diffusivity. Lastly, we prove that along a subsequence of diffusivities, any maximizer is periodic, in a sense.