A note on computable \'etale spaces

Abstract

An \'etale space over a topological space Y is defined as a local homeomorphism from a topological space X into Y. They often come up in topos theory because of the equivalence between sheaves and \'etale spaces over a space. In this note, we define computable \'etale spaces over a computable topological space Y within the TTE framework of computable topology, and show they are naturally equivalent to computable functions from Y to ODS, the effective quasi-Polish category of overt-discrete quasi-Polish spaces. More generally, if C is a computable category (or groupoid), then there is an equivalence between computable functors from C to ODS, and computable \'etale spaces equipped with a computable action by C.