Numerical optimization is arguably the most prominent computational framework in machine learning and AI. It can be seen as an assembly language for hard combinatorial problems ranging from classification and regression in learning, to computing optimal policies and equilibria in decision theory, to entropy minimization in information sciences. Unfortunately, specifying such problems in complex domains involving relations, objects and other logical dependencies is cumbersome at best, requiring considerable expert knowledge, and solvers require models to be painstakingly reduced to standard forms. To overcome this, we introduce a rich modeling framework for optimization problems that allows convenient codification of symbolic structure. Rath...
The solution of KKT systems is ubiquitous in optimization methods and often dominates the computatio...
The efficiency and effectiveness of most optimization algorithms hinges on the numerical linear alge...
Interior-point algorithms are a new class of optimization routines which exhibit several theoretical...
The theory of nonlinear optimization traditionally studies numeric com-putations. However, increasin...
Convex optimization is a branch of mathematics dealing with non-linear optimization problems with ad...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
The theory of nonlinear optimization traditionally studies numeric computations. However, increasing...
Abstract. This paper provides algorithms for numerical solution of convex matrix inequalities in whi...
This toolbox supports the results in the following publication: Pickering, L., del Río, T., England...
International audienceWe provide two hybrid numeric-symbolic optimization algorithms, computing exac...
Abstract. Solution methods for very large scale optimization problems are addressed in this paper. I...
Matrix-vector notation is the predominant idiom in which machine learning formulae are expressed; so...
Decision diagrams (DDs) are graphical structures that can be used to solve discrete optimization pro...
Constraint optimization underlies many problems in AI. We present a novel algorithm for finite domai...
Symbolic design optimization: a computer aided method to increase monotonicity through variable refo...
The solution of KKT systems is ubiquitous in optimization methods and often dominates the computatio...
The efficiency and effectiveness of most optimization algorithms hinges on the numerical linear alge...
Interior-point algorithms are a new class of optimization routines which exhibit several theoretical...
The theory of nonlinear optimization traditionally studies numeric com-putations. However, increasin...
Convex optimization is a branch of mathematics dealing with non-linear optimization problems with ad...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
The theory of nonlinear optimization traditionally studies numeric computations. However, increasing...
Abstract. This paper provides algorithms for numerical solution of convex matrix inequalities in whi...
This toolbox supports the results in the following publication: Pickering, L., del Río, T., England...
International audienceWe provide two hybrid numeric-symbolic optimization algorithms, computing exac...
Abstract. Solution methods for very large scale optimization problems are addressed in this paper. I...
Matrix-vector notation is the predominant idiom in which machine learning formulae are expressed; so...
Decision diagrams (DDs) are graphical structures that can be used to solve discrete optimization pro...
Constraint optimization underlies many problems in AI. We present a novel algorithm for finite domai...
Symbolic design optimization: a computer aided method to increase monotonicity through variable refo...
The solution of KKT systems is ubiquitous in optimization methods and often dominates the computatio...
The efficiency and effectiveness of most optimization algorithms hinges on the numerical linear alge...
Interior-point algorithms are a new class of optimization routines which exhibit several theoretical...