BibTex format

author = {Evans, DM and Rashwan, OA},
doi = {10.1006/jabr.2001.9110},
journal = {Journal of Algebra},
pages = {757--777},
title = {Bounds in the theory of finite covers},
url = {},
volume = {250},
year = {2002}

RIS format (EndNote, RefMan)

AB - We give an upper bound for the number of conjugacy classes of closed subgroups of the full wreath product FWr W Sym(Ω) which project onto Sym(Ω). Here, Ω is infinite, W is the set of n-tuples of distinct elements from Ω (for some finite n), F is a finite nilpotent group, and the topology on the wreath product is that of pointwise convergence in its imprimitive permutation action. The result addresses a problem which arises in a natural model-theoretic context about classifying certain types of finite covers. © 2002 Elsevier Science (USA).
AU - Evans,DM
AU - Rashwan,OA
DO - 10.1006/jabr.2001.9110
EP - 777
PY - 2002///
SN - 0021-8693
SP - 757
TI - Bounds in the theory of finite covers
T2 - Journal of Algebra
UR -
VL - 250
ER -