On The Group Of Self-homotopy Equivalences Of An Elliptic Space
Abstract
Let X be a simply connected rational elliptic space of formal dimension n and let (X) denote the group of homotopy classes of self-equivalences of X. If X[k] denotes the kth Postikov section of X and Xk denotes its kth skeleton, then making use of the models of Sullivan and Quillen we prove that (X)(X[n]) and if n>m=max\k \,| \,πk(X)≠ 0\ and (X) is finite, then (X)(Xm+1). Moreover, in case when X is 2-connected, we show that if πn(X)≠0, then the group (X) is infinite.
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