@article{oai:ynu.repo.nii.ac.jp:00006825,
 author = {Shitanda, Yoshimi},
 issue = {2},
 journal = {Yokohama Mathematical Journal = 横濱市立大學紀要. D部門, 数学},
 month = {},
 note = {application/pdf, Let ＄BG＄ and ＄B＄ Aut (X) be classifying spaces of a Lie group ＄G＄ with finite connected components and a topological monoid Aut(X) of self homotopy equivalences of finite complex ＄X＄ respectively. We determine a homotopy set of maps between ＄BG＄ and ＄B＄ Aut (X) which are homotopic to the constant map on skeletons. By applying this result to the canonical map [X, ＄BG＄] ＄￥rightarrow＄ [＄X,＄ ＄B＄ Aut ＄(G)＄ ], we give some examples of fibre bundles and fibre spaces and study the relations between the fibre bundles isomorphism and the fibre homotopy quivalence.},
 pages = {121--127},
 title = {FIBRATIONS OVER CLASSIFYING SPACES},
 volume = {38},
 year = {1991}
}