Spaces of maps into classifying spaces 
for equivariant crossed complexes  
by R Brown, M Golasi\'{n}ski, T Porter, and A Tonks.  

  
ABSTRACT  We give an equivariant version of
the homotopy theory of crossed complexes. The applications
generalize work on equivariant Eilenberg-Mac Lane spaces,
including the non abelian case of dimension 1, and on local
systems. It also generalizes the theory of  equivariant 2-types,
due to Moerdijk and Svensson. Further, we give results not just
on the homotopy classification of maps but also on the homotopy
types of certain equivariant function spaces. 

R. Brown, T.Porter
School of Mathematics 
University of Wales, Bangor
Gwynedd LL57 1UT
United Kingdom

M. Golasinski 
Department of Mathematics
Nicholas Copernicus University
Torun
Poland

A. Tonks
Institut Matematicas 
Univerdidad Autonoma Barcelona
08193 Bellaterra
Barcelona
Spain