Your search keyword '"DAO, MINH N."' showing total 4 results

1. Conical averagedness and convergence analysis of fixed point algorithms.

Author

Bartz, Sedi, Dao, Minh N., and Phan, Hung M.

Subjects

FORWARD-backward algorithm, MONOTONE operators, RESOLVENTS (Mathematics), ALGORITHMS

Abstract

We study a conical extension of averaged nonexpansive operators and the role it plays in convergence analysis of fixed point algorithms. Various properties of conically averaged operators are systematically investigated, in particular, the stability under relaxations, convex combinations and compositions. We derive conical averagedness properties of resolvents of generalized monotone operators. These properties are then utilized in order to analyze the convergence of the proximal point algorithm, the forward–backward algorithm, and the adaptive Douglas–Rachford algorithm. Our study unifies, improves and casts new light on recent studies of these topics. [ABSTRACT FROM AUTHOR]

Published

2022

2. Generalized Bregman Envelopes and Proximity Operators.

Author

Burachik, Regina S., Dao, Minh N., and Lindstrom, Scott B.

Subjects

*MONOTONE operators, *CONVEX functions, *COERCIVE fields (Electronics)

Abstract

Every maximally monotone operator can be associated with a family of convex functions, called the Fitzpatrick family or family of representative functions. Surprisingly, in 2017, Burachik and Martínez-Legaz showed that the well-known Bregman distance is a particular case of a general family of distances, each one induced by a specific maximally monotone operator and a specific choice of one of its representative functions. For the family of generalized Bregman distances, sufficient conditions for convexity, coercivity, and supercoercivity have recently been furnished. Motivated by these advances, we introduce in the present paper the generalized left and right envelopes and proximity operators, and we provide asymptotic results for parameters. Certain results extend readily from the more specific Bregman context, while others only extend for certain generalized cases. To illustrate, we construct examples from the Bregman generalizing case, together with the natural "extreme" cases that highlight the importance of which generalized Bregman distance is chosen. [ABSTRACT FROM AUTHOR]

Published

2021

3. ADAPTIVE DOUGLAS-RACHFORD SPLITTING ALGORITHM FOR THE SUM OF TWO OPERATORS.

Author

DAO, MINH N. and PHAN, HUNG M.

Subjects

*ALGORITHMS, *MONOTONE operators, *CONVEX functions

Abstract

The Douglas-Rachford algorithm is a classical and powerful splitting method for minimizing the sum of two convex functions and, more generally, finding a zero of the sum of two maximally monotone operators. Although this algorithm is well understood when the involved operators are monotone or strongly monotone, the convergence theory for weakly monotone settings is far from being complete. In this paper, we propose an adaptive Douglas-Rachford splitting algorithm for the sum of two operators, one of which is strongly monotone while the other one is weakly monotone. With appropriately chosen parameters, the algorithm converges globally to a fixed point from which we derive a solution of the problem. When one operator is Lipschitz continuous, we prove global linear convergence, which sharpens recent known results. [ABSTRACT FROM AUTHOR]

Published

2019

4. Linear convergence of the generalized Douglas-Rachford algorithm for feasibility problems.

Author

Dao, Minh N. and Phan, Hung M.

Subjects

FEASIBILITY problem (Mathematical optimization), ALGORITHMS, MATHEMATICAL optimization, MONOTONE operators, SUBSPACES (Mathematics)

Abstract

In this paper, we study the generalized Douglas-Rachford algorithm and its cyclic variants which include many projection-type methods such as the classical Douglas-Rachford algorithm and the alternating projection algorithm. Specifically, we establish several local linear convergence results for the algorithm in solving feasibility problems with finitely many closed possibly nonconvex sets under different assumptions. Our findings not only relax some regularity conditions but also improve linear convergence rates in the literature. In the presence of convexity, the linear convergence is global. [ABSTRACT FROM AUTHOR]

Published

2018