# Injective resolution of the ring of entire functions

Let $$R$$ be the ring of entire functions on $$\mathbb{C}$$. I heard that the concrete value of the global dimension of the ring depends on continuum hypothesis. I would think that the injective dimension of the regular module $$R$$ should coincide with the global dimension for this ring but I'm not sure.

Question: Can one write down an explicit (minimal) injective resolution of the regular module $$R$$? How does it look like in case it is possible?