Journal article

Constraint Reduction Reformulations for Projection Algorithms with Applications to Wavelet Construction

MN Dao, ND Dizon, JA Hogan, MK Tam

Journal of Optimization Theory and Applications | Published : 2021

Abstract

We introduce a reformulation technique that converts a many-set feasibility problem into an equivalent two-set problem. This technique involves reformulating the original feasibility problem by replacing a pair of its constraint sets with their intersection, before applying Pierra’s classical product space reformulation. The step of combining the two constraint sets reduces the dimension of the product spaces. We refer to this technique as the constraint reduction reformulation and use it to obtain constraint-reduced variants of well-known projection algorithms such as the Douglas–Rachford algorithm and the method of alternating projections, among others. We prove global convergence of const..

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University of Melbourne Researchers

Grants

Awarded by Australian Research Council


Funding Acknowledgements

The authors would like to thank Scott Lindstrom for his helpful insights on Theorem 3.1 and Hui Ouyang for her constructive inputs. The authors are also grateful to the reviewers for their valuable feedback and insightful comments. The authorswere partially supported by theAustralian Research Council through grants DP160101537 (MND, NDD and JAH), DP190100555 (MND) and DE200100063 (MKT).