The paper presents complete characterizations of Lipschitzian full stability of locally optimal solutions to second-order cone programs (SOCPs) expressed entirely in terms of their initial data. These characterizations are obtained via appropriate versions of the quadratic growth and strong second-order sufficient conditions under the corresponding constraint qualifications. We also establish close relationships between full stability of local minimizers for SOCPs and strong regularity of the associated generalized equations at nondegenerate points. Our approach is mainly based on advanced tools of second-order variational analysis and generalized differentiation
The dissertation concerns a systematic study of full stability in general optimization models includ...
summary:The present paper studies the following constrained vector optimization problem: $\min _Cf(x...
In this paper, we analyze optimal control problems governed by semilinear parabolic equations. Box c...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
AbstractIn a second-order cone program (SOCP) a linear function is minimized over the intersection o...
The present paper is concerned with optimization problems in which the data are differentiable funct...
AbstractCertain stability concepts for local minimizers of nonlinear programs require, on the one ha...
We discuss first and second order optimality conditions for nonlinear second-order cone programming ...
summary:In this paper, we present a new one-step smoothing Newton method for solving the second-orde...
summary:In this paper, we present a sensitivity result for quadratic second-order cone programming u...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...
The second-order cone (SOC), also called the Lorentz cone, is a special class of convex cones. So fa...
We discuss rst and second order optimality conditions for nonlinear second-order cone programming pr...
This paper concerns second-order analysis for a remarkable class of variational systems in finite-di...
The dissertation concerns a systematic study of full stability in general optimization models includ...
summary:The present paper studies the following constrained vector optimization problem: $\min _Cf(x...
In this paper, we analyze optimal control problems governed by semilinear parabolic equations. Box c...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
Abstract. This paper is mainly devoted to the study of the so-called full Lipschitzian stability of ...
AbstractIn a second-order cone program (SOCP) a linear function is minimized over the intersection o...
The present paper is concerned with optimization problems in which the data are differentiable funct...
AbstractCertain stability concepts for local minimizers of nonlinear programs require, on the one ha...
We discuss first and second order optimality conditions for nonlinear second-order cone programming ...
summary:In this paper, we present a new one-step smoothing Newton method for solving the second-orde...
summary:In this paper, we present a sensitivity result for quadratic second-order cone programming u...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...
The second-order cone (SOC), also called the Lorentz cone, is a special class of convex cones. So fa...
We discuss rst and second order optimality conditions for nonlinear second-order cone programming pr...
This paper concerns second-order analysis for a remarkable class of variational systems in finite-di...
The dissertation concerns a systematic study of full stability in general optimization models includ...
summary:The present paper studies the following constrained vector optimization problem: $\min _Cf(x...
In this paper, we analyze optimal control problems governed by semilinear parabolic equations. Box c...