Paulo Roberto Oliveira

An Interior Proximal Method in Vector Optimization

  • Paulo Roberto Oliveira
  • Kely Diana Villacorta
    • Categories Multi-Criteria Optimization Tags , ,

    This paper studies the vector optimization problem of finding weakly ef- ficient points for maps from Rn to Rm, with respect to the partial order induced by a closed, convex, and pointed cone C ⊂ Rm, with nonempty inte- rior. We develop for this problem an extension of the proximal point method for scalar-valued convex … Read more

    A Logarithmic-Quadratic Proximal Point Scalarization Method for Multiobjective Programming

  • Ronaldo Malheiros Gregório
  • Paulo Roberto Oliveira
    • Categories Multi-Criteria Optimization Tags , ,

    We present a proximal point method to solve multiobjective problems based on the scalarization for maps. We build a family of a convex scalar strict representation of a convex map F with respect to the lexicographic order on Rm and we add a variant of the logarithmquadratic regularization of Auslender, where the unconstrained variables in … Read more

    Proximal Point Methods for Functions Involving Lojasiewicz, Quasiconvex and Convex Properties on Hadamard Manifolds

  • Paulo Roberto Oliveira
  • Erik Alex Papa Quiroz
    • Categories Nonlinear Optimization Tags , , ,

    This paper extends the full convergence of the proximal point method with Riemannian, Semi-Bregman and Bregman distances to solve minimization problems on Hadamard manifolds. For the unconstrained problem, under the assumptions that the optimal set is nonempty and the objective function is continuous and either quasiconvex or satisfies a generalized Lojasiewicz property, we prove the … Read more

    A Proximal Point Algorithm with Bregman Distances for Quasiconvex Optimization over the Positive Orthant

  • João Xavier da Cruz Neto
  • Paulo Roberto Oliveira
  • Antoine Soubeyran
  • Sissy da S. Souza
    • Categories Generalized Convexity/Monoticity Tags , , ,

    We present an interior proximal point method with Bregman distance, whose Bregman function is separable and the zone is the interior of the positive orthant, for solving the quasiconvex optimization problem under nonnegative constraints. We establish the well-definedness of the sequence generated by our algorithm and we prove convergence to a solution point when the … Read more

    A New Class of Interior Proximal Methods for Optimization over the Positive Orthant

  • Paulo Roberto Oliveira
  • Sissy da S. Souza
    • Categories Convex and Nonsmooth Optimization, Nonlinear Optimization Tags , , ,

    In this work we present a family of variable metric interior proximal methods for solving optimization problems under nonnegativity constraints. We define two algorithms, in the inexact and exact forms. The kernels are metrics generated by diagonal matrices in each iteration and the regularization parameters are conveniently chosen to force the iterates to be interior … Read more

    On the Convergence of the Entropy-Exponential Penalty Trajectories and Generalized Proximal Point Methods in Semidefinite Optimization

  • Orizon Pereira Ferreira
  • Paulo Roberto Oliveira
  • R. C. M. Silva
    • Categories Linear, Cone and Semidefinite Programming, Semi-definite Programming Tags , , ,

    The convergence of primal and dual central paths associated to entropy and exponential functions, respectively, for semidefinite programming problem are studied in this paper. As an application, the proximal point method with the Kullback-Leibler distance applied to semidefinite programming problems is considered, and the convergence of primal and dual sequences is proved. Citation Journal of … Read more

    An Extension of the Proximal Point Method for Quasiconvex Minimization

  • Paulo Roberto Oliveira
  • Erik Alex Papa Quiroz
    • Categories Generalized Convexity/Monoticity, Unconstrained Optimization Tags , , ,

    In this paper we propose an extension of the proximal point method to solve minimization problems with quasiconvex objective functions on the Euclidean space and the nonnegative orthant. For the unconstrained minimization problem, assumming that the function is bounded from below and lower semicontinuous we prove that iterations fxkg given by 0 2 b@(f(:)+(k=2)jj:􀀀xk􀀀1jj2)(xk) are … Read more

    Steepest descent method for quasiconvex minimization on Riemannian manifolds

  • Paulo Roberto Oliveira
  • Erik Alex Papa Quiroz
  • E. M. Quispe
    • Categories Constrained Nonlinear Optimization, Generalized Convexity/Monoticity

    This paper extends the full convergence of the steepest descent algorithm with a generalized Armijo search and a proximal regularization to solve quasiconvex minimization problems defined on complete Riemannian manifolds. Previous convergence results are obtained as particular cases of our approach and some examples in non Euclidian spaces are given. Citation J. Math. Anal. Appl. … Read more

    Proximal Point Methods for Quasiconvex and Convex Functions With Bregman Distances

  • Paulo Roberto Oliveira
  • Erik Alex Papa Quiroz
    • Categories Convex Optimization, Generalized Convexity/Monoticity Tags ,

    This paper generalizes the proximal point method using Bregman distances to solve convex and quasiconvex optimization problems on noncompact Hadamard manifolds. We will proved that the sequence generated by our method is well defined and converges to an optimal solution of the problem. Also, we obtain the same convergence properties for the classical proximal method, … Read more

    Central Paths in Semidefinite Programming, Generalized Proximal Point Method and Cauchy Trajectories in Riemannian Manifolds

  • João Xavier da Cruz Neto
  • Orizon Pereira Ferreira
  • Paulo Roberto Oliveira
  • R. C. M. Silva
    • Categories Linear, Cone and Semidefinite Programming Tags , , , ,

    The relationships among central path in the context of semidefinite programming, generalized proximal point method and Cauchy trajectory in Riemannian manifolds is studied in this paper. First it is proved that the central path associated to the general function is well defined. The convergence and characterization of its limit point is established for functions satisfying … Read more