Indecomposability of the stiefel manifolds Vm, k

Using Stiefel manifolds (real, complex, and symplectic) as examples, it is shown that (A) 5 (B) n (C) $ (C) in a differentiable sense, where (A) denotes the class of all regular Riemannian &symmetric spaces (k 2 2), (B) th e c ass of all pointwise Riemannian k-symmetric 1 spaces (L 2 2), and (C) the

In the paper we study a relation between irregular subsets of the Grassmanian manifolds and projections of k-dimensional subsets of R n onto k-dimensional planes. We also consider applications of th results to study universal k-dimensional spaces.

An analogue of Calabi's conjecture was posed on a class of complete noncompact Kihler manifolds [5], then solved on the simplest of them, the complex n-space with n > 2 [9]. Here we prove the conjecture in its full generality, by inverting an elliptic complex Monge-Amp&e operator between suitable Fr