2010
DOI: 10.1080/02331930902884273
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A proximal point algorithm with a ϕ-divergence for quasiconvex programming

Abstract: We use the proximal point method with the ϕ-divergence given by ϕ(t) = t−log t− 1 for the minimization of quasiconvex functions subject to nonnegativity constraints. We establish that the sequence generated by our algorithm is well-defined in the sense that it exists and it is not cyclical. Without any assumption of boundedness level to the objective function, we obtain that the sequence converges to a stationary point. We also prove that when the regularization parameters go to zero, the sequence converges to… Show more

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Cited by 10 publications
(14 citation statements)
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“…However, only few can be found for the quasiconvex case, i.e., when the objective function in the minimization problem is quasiconvex. We describe next the recent studies [10][11][12][13] concerning the quasiconvex case. In [10,11,13], the proximal method for minimizing smooth quasiconvex functions was studied, where [13] works with a class of separated Bregman distances and [10,11] with a particular φ-divergence distance.…”
Section: Introductionmentioning
confidence: 99%
See 1 more Smart Citation
“…However, only few can be found for the quasiconvex case, i.e., when the objective function in the minimization problem is quasiconvex. We describe next the recent studies [10][11][12][13] concerning the quasiconvex case. In [10,11,13], the proximal method for minimizing smooth quasiconvex functions was studied, where [13] works with a class of separated Bregman distances and [10,11] with a particular φ-divergence distance.…”
Section: Introductionmentioning
confidence: 99%
“…We describe next the recent studies [10][11][12][13] concerning the quasiconvex case. In [10,11,13], the proximal method for minimizing smooth quasiconvex functions was studied, where [13] works with a class of separated Bregman distances and [10,11] with a particular φ-divergence distance. In [12], the proximal method with Bregman distances was studied and convergence was proved when f is a convex or quasiconvex function on noncompact Hadamard manifolds.…”
Section: Introductionmentioning
confidence: 99%
“…So we believe that our algorithm is more practical than previous works in proximal methods with quasiconvex functions, see Cunha et al [12], Chen and Pan [11], Souza et al [32] and Papa Quiroz and Oliveira [26]. Proof.…”
Section: Remark 41mentioning
confidence: 87%
“…Attouch and Teboulle [5], with a regularized Lotka-Volterra dynamical system, have proved the convergence of the continuous method to a point which belongs to a certain set which contains the set of optimal points; see also Alvarez et al [2], that treats a general class of dynamical systems that includes the one of Attouch and Teboulle [5], and includes also the case of quasiconvex objective functions in connection with continuous in time models of generalized proximal point algorithms. Cunha et al [12] and Chen and Pan [11], with a particular φ-divergence distance, have proved the full convergence of the proximal method to the KKT-point of the problem when parameter λ k is bounded and convergence to an optimal solution when λ k → 0. Pan and Chen [23], with the second-order homogeneous distance, and Souza et al [32] with a class of separated Bregman distances, have proved the same convergence result of [11,12].…”
Section: Introductionmentioning
confidence: 99%
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