Journal article

Convergence rates for boundedly regular systems

ER Csetnek, A Eberhard, MK Tam

Advances in Computational Mathematics | Published : 2021

Abstract

In this work, we consider a continuous dynamical system associated with the fixed point set of a nonexpansive operator which was originally studied by Boţ and Csetnek (J. Dyn. Diff. Equat. 29(1), pp. 155–168, 2017). Our main results establish convergence rates for the system’s trajectories when the nonexpansive operator satisfies an additional regularity property. This setting is the natural continuous-time analogue to discrete-time results obtained in Bauschke, Noll and Phan (J. Math. Anal. Appl. 421(1), pp. 1–20, 2015) and Borwein, Li and Tam (SIAM J. Optim. 27(1), pp. 1–33, 2017) by using the same regularity properties. Closure properties of the class of Hölder regular operators under tak..

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University of Melbourne Researchers

Grants

Awarded by Australian Research Council


Funding Acknowledgements

The first author is supported by FWF (Austrian Science Fund) project P 29809-N32. The second author is supported in part by ARC grant DP200101197. The third author is supported in part by ARC grant DE200100063.