Let Aut. (X) denote the group of homotopy classes of self-homotopy equivalences of X, which induce identity automorphisms of homology group. We describe a decomposition of Aut. (X1 V…VXn) as a product of its simp...Let Aut. (X) denote the group of homotopy classes of self-homotopy equivalences of X, which induce identity automorphisms of homology group. We describe a decomposition of Aut. (X1 V…VXn) as a product of its simpler subgroups. We consider the subgroup Aut∑(X) of all self homotopy classes α of X such that ∑α=1∑X: ∑X → ∑X, and also give some properties of Aut∑(X).展开更多
基金supported by NNSF (10672146) of Chinathe Program Young Teacher in Higher Education Institution of Zhejiang
文摘Let Aut. (X) denote the group of homotopy classes of self-homotopy equivalences of X, which induce identity automorphisms of homology group. We describe a decomposition of Aut. (X1 V…VXn) as a product of its simpler subgroups. We consider the subgroup Aut∑(X) of all self homotopy classes α of X such that ∑α=1∑X: ∑X → ∑X, and also give some properties of Aut∑(X).
