In this paper, we study the problem of escaping from saddle points in smooth nonconvex optimization problems subject to a convex set C. We propose a generic framework that yields convergence to a second-order stationary point of the problem, if the convex set C is simple for a quadratic objective function. Specifically, our results hold if one can find a ρ-approximate solution of a quadratic program subject to C in polynomial time, where ρ < 1 is a positive constant that depends on the structure of the set C. Under this condition, we show that the sequence of iterates generated by the proposed framework reaches an (ε, γ)-second order stationary point (SOSP) in at most O(max{ε- 2 , ρ -3 γ -3 }) iterations. We further characterize the overall...
This article proposes large-scale convex optimization problems to be solved via saddle points of the...
In this paper we consider the problem of minimizing a (possibly nonconvex) quadratic function with a...
This thesis aims at developing efficient algorithms for solving complex and constrained convex optim...
We present an algorithm for the constrained saddle point problem with a convex-concave function L an...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
We present a global error bound for the projected gradient of nonconvex constrained optimization pro...
. We describe an algorithm for optimization of a smooth function subject to general linear constrain...
Optimization is an important field of applied mathematics with many applications in various domains,...
We present a globally and superlinearly convergent algorithm for solving convex quadratic programs ...
Constrained optimization problems where both the objective and constraints may be nonsmooth and nonc...
Local search heuristics for non-convex optimizations are popular in applied machine learning. Howeve...
Computational methods are considered for finding a point that satisfies the second-order necessary c...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
This article proposes large-scale convex optimization problems to be solved via saddle points of the...
In this paper we consider the problem of minimizing a (possibly nonconvex) quadratic function with a...
This thesis aims at developing efficient algorithms for solving complex and constrained convex optim...
We present an algorithm for the constrained saddle point problem with a convex-concave function L an...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
We present a global error bound for the projected gradient of nonconvex constrained optimization pro...
. We describe an algorithm for optimization of a smooth function subject to general linear constrain...
Optimization is an important field of applied mathematics with many applications in various domains,...
We present a globally and superlinearly convergent algorithm for solving convex quadratic programs ...
Constrained optimization problems where both the objective and constraints may be nonsmooth and nonc...
Local search heuristics for non-convex optimizations are popular in applied machine learning. Howeve...
Computational methods are considered for finding a point that satisfies the second-order necessary c...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
This article proposes large-scale convex optimization problems to be solved via saddle points of the...
In this paper we consider the problem of minimizing a (possibly nonconvex) quadratic function with a...
This thesis aims at developing efficient algorithms for solving complex and constrained convex optim...