I'm using the following definition: A topological space $X$ is called compactly generated if it verifies: Any subset $U$ of $X$ is open iff for any Hausdorff compact space $Y$ and continuous map $f:Y\to X$, $f^{-1}(U)$ is open. I find the requirement of Hausdorffness on the source spaces make it rather hard to check if a non-Hausdorff topological space is compactly generated directly through the definition. Thus I come about this question:
Let $C$ denote a countable infinite set endowed with the cofinite topology (that is, the set of closed sets consists of $C$ itself and all its finite subsets). Then is $C$ compactly generated?