Rational homotopy of maps between certain complex Grassmann manifolds
Abstract
Let Gn,k denote the complex Grassmann manifold of k-dimensional vector subspaces of Cn. Assume l,k n/2. We show that, for sufficiently large n, any continuous map h:Gn,l Gn,k is rationally null homotopic if (i)~ 1 k< l, (ii)~2<l<k< 2(l-1), (iii)~1<l<k, l divides n but l does not divide k.
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