A remark on the convergence of the Douglas-Rachford iteration in a non-convex setting
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🧮 math.OC
keywords
convergencedouglas-rachforditerationcompactconstructionfunctionimpliesline
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Using the construction of a Lyapunov function, it is shown that the Douglas-Rachford iteration with respect to a sphere and a line in $\mathbb R^d$ is robustly $\mathcal{KL}$-stable. This implies a convergence which is stronger than uniform convergence on compact sets.
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