Finding maximum a posteriori (MAP) assignments in graphical models is an important task in many applications. Since the problem is generally hard, linear programming (LP) relaxations are often used. Solving these relaxations efficiently is thus an important practical problem. In recent years, several authors have proposed message passing updates corresponding to coordinate descent in the dual LP. However, these are generally not guaranteed to converge to a global optimum. One approach to remedy this is to smooth the LP, and perform coordinate descent on the smoothed dual. However, little is known about the convergence rate of this procedure. Here we perform a thorough rate analysis of such schemes and derive primal and dual convergence rate...
International audienceFor composite nonsmooth optimization problems, which are "regular enough", pro...
We study the generalized linear coordinate-descent (GLiCD) algorithm for the quadratic optimization ...
International audienceState-of-the-art methods for solving smooth optimization problems are nonlinea...
Finding maximum a posteriori (MAP) assignments in graphical models is an important task in many appl...
Finding maximum a posteriori (MAP) assignments in graphical models is an im-portant task in many app...
We present a novel message passing algorithm for approximating the MAP prob-lem in graphical models....
abstract URL: http://jmlr.csail.mit.edu/proceedings/papers/v5/sontag09a.htmlA number of linear progr...
International audienceThe Vu-Condat algorithm is a standard method for finding a saddle point of a L...
We consider a linear programming relaxation of the MAP-inference problem. Its dual can be treated as...
Maximum a posteriori (MAP) inference is one of the fundamental inference tasks in graphical models. ...
Difference-of-Convex (DC) minimization, referring to the problem of minimizing the difference of two...
We study the MAP-labeling problem for graphical mod-els by optimizing a dual problem obtained by Lag...
Abstract Coordinate descent algorithms solve optimization problems by suc-cessively performing appro...
We study the MAP-labeling problem for graphical mod-els by optimizing a dual problem obtained by Lag...
Coordinate descent with random coordinate selection is the current state of the art for many large s...
International audienceFor composite nonsmooth optimization problems, which are "regular enough", pro...
We study the generalized linear coordinate-descent (GLiCD) algorithm for the quadratic optimization ...
International audienceState-of-the-art methods for solving smooth optimization problems are nonlinea...
Finding maximum a posteriori (MAP) assignments in graphical models is an important task in many appl...
Finding maximum a posteriori (MAP) assignments in graphical models is an im-portant task in many app...
We present a novel message passing algorithm for approximating the MAP prob-lem in graphical models....
abstract URL: http://jmlr.csail.mit.edu/proceedings/papers/v5/sontag09a.htmlA number of linear progr...
International audienceThe Vu-Condat algorithm is a standard method for finding a saddle point of a L...
We consider a linear programming relaxation of the MAP-inference problem. Its dual can be treated as...
Maximum a posteriori (MAP) inference is one of the fundamental inference tasks in graphical models. ...
Difference-of-Convex (DC) minimization, referring to the problem of minimizing the difference of two...
We study the MAP-labeling problem for graphical mod-els by optimizing a dual problem obtained by Lag...
Abstract Coordinate descent algorithms solve optimization problems by suc-cessively performing appro...
We study the MAP-labeling problem for graphical mod-els by optimizing a dual problem obtained by Lag...
Coordinate descent with random coordinate selection is the current state of the art for many large s...
International audienceFor composite nonsmooth optimization problems, which are "regular enough", pro...
We study the generalized linear coordinate-descent (GLiCD) algorithm for the quadratic optimization ...
International audienceState-of-the-art methods for solving smooth optimization problems are nonlinea...