In this paper, the Iri-Imai algorithm for solving linear and convex quadratic programming is extended to solve some other smooth convex programming problems. The globally linear convergence rate of this extended algorithm is proved, under the condition that the objective and constraint functions satisfy a certain type of convexity (called the harmonic convexity in this paper). A characterization of this convexity condition is given. In Ref. 14, the same convexity condition is used to prove the convergence of a path-following algorithm. The Iri-Imai algorithm is a natural generalization of the original Newton algorithm to constrained convex programming. Other known convergent interior point algorithms for smooth convex programming are mainly...
The affine scaling algorithm is one of the earliest interior point methods developed for linear prog...
AbstractWe introduce two interior point algorithms for minimizing a convex function subject to linea...
A computationally efficient method to solve non-convex programming problems with linear equality con...
textabstractIn this paper, the Iri-Imai algorithm for solving linear and convex quadratic programmin...
In this paper, we propose an extension of the so-called Iri-Imai method to solve constrained convex ...
An algorithm for linear programming (LP) and convex quadratic programming (CQP) is proposed, based o...
Written for specialists working in optimization, mathematical programming, or control theory. The ge...
Convex programming is the simplest and best processed area of nonlinear programming. Many propertie...
An algorithm for linear programming (LP) and convex quadratic programming (CQP) is proposed, based o...
This paper proposes three numerical algorithms based on Karmarkar’s interior point technique for sol...
This note derives bounds on the length of the primal-dual affine scaling directions associated with ...
In this paper is described how to efficiently solve a convex quadratic programming problems using a ...
The standard assumption for proving linear convergence of first order methods for smooth convex opti...
We present a globally and superlinearly convergent algorithm for solving convex quadratic programs ...
We describe an interior point algorithm for convex quadratic problem with a strict complementarity c...
The affine scaling algorithm is one of the earliest interior point methods developed for linear prog...
AbstractWe introduce two interior point algorithms for minimizing a convex function subject to linea...
A computationally efficient method to solve non-convex programming problems with linear equality con...
textabstractIn this paper, the Iri-Imai algorithm for solving linear and convex quadratic programmin...
In this paper, we propose an extension of the so-called Iri-Imai method to solve constrained convex ...
An algorithm for linear programming (LP) and convex quadratic programming (CQP) is proposed, based o...
Written for specialists working in optimization, mathematical programming, or control theory. The ge...
Convex programming is the simplest and best processed area of nonlinear programming. Many propertie...
An algorithm for linear programming (LP) and convex quadratic programming (CQP) is proposed, based o...
This paper proposes three numerical algorithms based on Karmarkar’s interior point technique for sol...
This note derives bounds on the length of the primal-dual affine scaling directions associated with ...
In this paper is described how to efficiently solve a convex quadratic programming problems using a ...
The standard assumption for proving linear convergence of first order methods for smooth convex opti...
We present a globally and superlinearly convergent algorithm for solving convex quadratic programs ...
We describe an interior point algorithm for convex quadratic problem with a strict complementarity c...
The affine scaling algorithm is one of the earliest interior point methods developed for linear prog...
AbstractWe introduce two interior point algorithms for minimizing a convex function subject to linea...
A computationally efficient method to solve non-convex programming problems with linear equality con...