The G\"unt\"urk-Thao theorem revisited: polyhedral cones and limiting examples
Abstract
In 2023, G\"unt\"urk and Thao proved that the sequence (x(n))n∈N generated by random (relaxed) projections drawn from a finite collection of innately regular closed subspaces in a real Hilbert space satisfies Σn∈N \|x(n)-x(n+1)\|γ <+∞ for all γ>0. We extend their result to a finite collection of polyhedral cones. Moreover, we construct examples showing the tightness of our extension: indeed, the result fails for a line and a convex set in R2, and for a plane and a non-polyhedral cone in R3.
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