BibTex format

author = {Evans, DM},
doi = {10.1016/S0168-0072(97)00018-3},
journal = {Annals of Pure and Applied Logic},
pages = {109--147},
title = {Finite covers with finite kernels},
url = {},
volume = {88},
year = {1997}

RIS format (EndNote, RefMan)

AB - We are concerned with the following problem. Suppose Γ and Σ are closed permutation groups on infinite sets C and W and ρ : Γ → Σ is a non-split, continuous epimorphism with finite kernel. Describe (for fixed Σ) the possibilities for ρ. Here, we consider the case where ρ arises from a finite cover π:C→W. We give reasonably general conditions on the permutation structure W;Σ which allow us to prove that these covers arise in two possible ways. The first way, reminiscent of covers of topological spaces, is as a covering of some Σ-invariant digraph on W. The second construction is less easy to describe, but produces the most familiar of these types of covers: a vector space covering its projective space.
AU - Evans,DM
DO - 10.1016/S0168-0072(97)00018-3
EP - 147
PY - 1997///
SN - 0168-0072
SP - 109
TI - Finite covers with finite kernels
T2 - Annals of Pure and Applied Logic
UR -
VL - 88
ER -