Recently, M. Bouafoa, et al. (Journal of optimization Theory and Applications, August, 2016), investigated a new kernel function which differs from the self-regular kernel functions. The kernel function has a trigonometric Barrier Term. In this paper we generalize the analysis presented in the above paper for Semidefinit Optimization Problems (SDO). It is shown that the interior-point methods based on this function for large-update methods, the iteration bound is improved significantly. For small-update interior point methods the iteration bound is the best currently known bound for primal-dual interior point methods. The analysis for SDO deviates significantly from the analysis for linear optimization. Several new tools and techniques are ...
summary:In this paper, we propose a large-update primal-dual interior point algorithm for linear opt...
Two important classes of polynomial-time interior-point method (IPMs) are small- and large-update me...
Interior-point methods for semidefinite optimization have been studied intensively, due to their pol...
AbstractIn this paper we present a new primal-dual path-following interior-point algorithm for semid...
Recently, Y.Q. Bai, M. El Ghami and C. Roos [3] introduced a new class of so-called eligible kernel ...
Recently, M.~Bouafoa, et al. investigated a new kernel function which differs from the self-regular ...
In this paper we are generalizing the efficient kernel function with trigonometric barrier term give...
We propose a new primal-dual interior-point algorithm based on a new kernel function for linear opti...
AbstractIn this paper, we present a new barrier function for primal–dual interior-point methods in l...
Abstract. In this paper we present a generic primal-dual interior point methods (IPMs) for linear op...
AbstractWe introduce a new kind of kernel function, which yields efficient large-update primal-dual ...
this paper we present a class of polynomial primal-dual interior-point algorithms for linear optimiz...
A class of large- and small- update primal-dual interior-point point algorithms for linear optimizat...
summary:In this paper we propose a primal-dual path-following interior-point algorithm for semidefin...
It is observed that an algorithm proposed in the 1980s for thesolution of nonconvex constrained opti...
summary:In this paper, we propose a large-update primal-dual interior point algorithm for linear opt...
Two important classes of polynomial-time interior-point method (IPMs) are small- and large-update me...
Interior-point methods for semidefinite optimization have been studied intensively, due to their pol...
AbstractIn this paper we present a new primal-dual path-following interior-point algorithm for semid...
Recently, Y.Q. Bai, M. El Ghami and C. Roos [3] introduced a new class of so-called eligible kernel ...
Recently, M.~Bouafoa, et al. investigated a new kernel function which differs from the self-regular ...
In this paper we are generalizing the efficient kernel function with trigonometric barrier term give...
We propose a new primal-dual interior-point algorithm based on a new kernel function for linear opti...
AbstractIn this paper, we present a new barrier function for primal–dual interior-point methods in l...
Abstract. In this paper we present a generic primal-dual interior point methods (IPMs) for linear op...
AbstractWe introduce a new kind of kernel function, which yields efficient large-update primal-dual ...
this paper we present a class of polynomial primal-dual interior-point algorithms for linear optimiz...
A class of large- and small- update primal-dual interior-point point algorithms for linear optimizat...
summary:In this paper we propose a primal-dual path-following interior-point algorithm for semidefin...
It is observed that an algorithm proposed in the 1980s for thesolution of nonconvex constrained opti...
summary:In this paper, we propose a large-update primal-dual interior point algorithm for linear opt...
Two important classes of polynomial-time interior-point method (IPMs) are small- and large-update me...
Interior-point methods for semidefinite optimization have been studied intensively, due to their pol...