Polynomial Estimates for the Method of Cyclic Projections in Hilbert Spaces
Abstract
We study the method of cyclic projections when applied to closed and linear subspaces Mi, i=1,…,m, of a real Hilbert space H. We show that the average distance to individual sets enjoys a polynomial behaviour o(k-1/2) along the trajectory of the generated iterates. Surprisingly, when the starting points are chosen from the subspace Σi=1mMi, our result yields a polynomial rate of convergence O(k-1/2) for the method of cyclic projections itself. Moreover, if Σi=1m Mi is not closed, then both of the aforementioned rates are best possible in the sense that the corresponding polynomial k1/2 cannot be replaced by k1/2+ for any >0.
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