Bilevel optimization has been developed for many machine learning tasks with large-scale and high-dimensional data. This paper considers a constrained bilevel optimization problem, where the lower-level optimization problem is convex with equality and inequality constraints and the upper-level optimization problem is non-convex. The overall objective function is non-convex and non-differentiable. To solve the problem, we develop a gradient-based approach, called gradient approximation method, which determines the descent direction by computing several representative gradients of the objective function inside a neighborhood of the current estimate. We show that the algorithm asymptotically converges to the set of Clarke stationary points, an...
We study a variant of the pessimistic bilevel optimization problem, which comprises constraints that...
This paper reviews gradient-based techniques to solve bilevel optimization problems. Bilevel optimiz...
The presented thesis discusses bilevel programming problems with the focus on solution algorithms. B...
Bilevel Optimization Programming is used to model complex and conflicting interactions between agent...
Abstract. We consider a bilevel optimization approach for parameter learning in nonsmooth variationa...
Bilevel programming refers to a class of problems with a characteristic nested structure. According ...
This review examines gradient-based techniques to solve bilevel optimization problems. Bilevel optim...
In the development of algorithms for convex optimization problems, symmetry plays a very important r...
Bilevel programming problems provide a framework to deal with decision processes involving two decis...
Automatic differentiation (AD) is a core element of most modern machine learning libraries that all...
Bilevel optimization problems, which are problems where two optimization problems are nested, have m...
Bilevel optimization, also referred to as bilevel programming, involves solving an upper level probl...
We consider the standard optimistic bilevel optimization problem, in particular upper- and lower-lev...
Bilevel optimization has found extensive applications in modern machine learning problems such as hy...
Bilevel optimization (BO) is useful for solving a variety of important machine learning problems inc...
We study a variant of the pessimistic bilevel optimization problem, which comprises constraints that...
This paper reviews gradient-based techniques to solve bilevel optimization problems. Bilevel optimiz...
The presented thesis discusses bilevel programming problems with the focus on solution algorithms. B...
Bilevel Optimization Programming is used to model complex and conflicting interactions between agent...
Abstract. We consider a bilevel optimization approach for parameter learning in nonsmooth variationa...
Bilevel programming refers to a class of problems with a characteristic nested structure. According ...
This review examines gradient-based techniques to solve bilevel optimization problems. Bilevel optim...
In the development of algorithms for convex optimization problems, symmetry plays a very important r...
Bilevel programming problems provide a framework to deal with decision processes involving two decis...
Automatic differentiation (AD) is a core element of most modern machine learning libraries that all...
Bilevel optimization problems, which are problems where two optimization problems are nested, have m...
Bilevel optimization, also referred to as bilevel programming, involves solving an upper level probl...
We consider the standard optimistic bilevel optimization problem, in particular upper- and lower-lev...
Bilevel optimization has found extensive applications in modern machine learning problems such as hy...
Bilevel optimization (BO) is useful for solving a variety of important machine learning problems inc...
We study a variant of the pessimistic bilevel optimization problem, which comprises constraints that...
This paper reviews gradient-based techniques to solve bilevel optimization problems. Bilevel optimiz...
The presented thesis discusses bilevel programming problems with the focus on solution algorithms. B...