Optimization and Equilibrium

Programación de estados cuánticos con pulsos.

Event Date: Nov 22, 2023 in Optimization and Equilibrium, Seminars

Resumen: En esta charla autocontenida, presentaremos una introducción a los fundamentos de la mecánica cuántica y computación cuántica. Además, introduciremos la nueva forma de controlar computadores cuánticos superconductores, la cual reemplaza a las compuertas cuánticas tradicionales por pulsos electromagnéticos arbitrarios.  

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A second-order descent method with active-set prediction for group sparse optimization.

Event Date: Oct 18, 2023 in Optimization and Equilibrium, Seminars

Abstract: In this talk, we propose a second-order algorithm for the solution of finite and infinite dimensional group sparse optimization problems. Group sparse optimization has gained a lot of attention in the last years due to several important classification problems requiring group sparse solutions. The most prominent application example is the group LASSO problem, which consists in minimizing a least-squares fitting term together with the group sparsity l1/l2 norm. The method is built upon the steepest descent directions of the nonsmooth problem, which are further modified by using...

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Partially non-convex minimax theorem and applications to remotal sets.

Event Date: Oct 18, 2023 in Optimization and Equilibrium, Seminars

Abstract: Given a convex subset B  A of a locally convex space Y  X; and a function f : Y  X ! R such that B is compact and f (y; ); y 2 Y; are concave and upper semicontinuous, we establish in a Örst step a minimax inequality of the form maxy2B infx2A f (y; x)  infx2A supy2B0 f (y; x); where B0 is the set of points y 2 B such that f (y; ) is proper and convex. The main di§erence with the classical minimax theorem is that, here, the set B0 does not need to be convex or compact. We use this result to give a new proof of the characterization of remotal sets, relying on the convexiy of the set...

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Globalization of the SCD semismooth* Newton method in nonsmooth nonconvex optimization

Event Date: Jul 19, 2023 in Optimization and Equilibrium, Seminars

Abstract:  We consider the problem of minimizing an lsc proper function. A locally superlinearly convergent method is given by the SCD (Subspace Containing Derivative) semismooth* Newton method for solving the first order necessary optimality conditions. We will discuss how to compute the SC derivative of the subdifferential mapping defining the linear system for the Newton direction. In order to globalize the SCD semismooth* Newton method, we combine it with some variant of the proximal gradient algorithm. We are able to show that every accumulation point of the sequence produced by our...

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Aproximación de juegos de campo medio de primer orden.

Event Date: May 03, 2023 in Optimization and Equilibrium, Seminario de Probabilidades de Chile, Seminars

Resumen:   Esta charla concierne la aproximación de juegos de campo medio de primer orden, o deterministas, introducidos por J.-M. Lasry y P.-L. Lions en el año 2007. Luego de introducir este tipo de juegos, nos concentraremos en la aproximación de la función valor de un jugador típico, elemento clave de la discretización del juego de campo medio. Esta última puede interpretarse como un juego de campo medio en tiempo discreto y espacio de estados finitos introducido por Gomes, Mohr y Souza en el año 2010. Luego de enunciar el teorema de convergencia principal, terminaremos la charla con...

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Convergence Rate of Nonconvex Douglas-Rachford splitting via merit functions, with applications to weakly convex constrained optimization.

Event Date: Apr 12, 2023 in Optimization and Equilibrium, Seminars

Abstract:  We analyze Douglas-Rachford splitting techniques applied to solving weakly convex optimization problems. Under mild regularity assumptions, and by the token of a suitable merit function, we show convergence to critical points and local linear rates of convergence. The merit function, comparable to the Moreau envelope in Variational Analysis, generates a descent sequence, a feature that allows us to extend to the non-convex setting arguments employed in convex optimization. A by-product of our approach is an ADMM-like method for constrained problems with weakly convex objective...

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