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ABSTRACT
In this article, we propose a new second-order infeasible primal-dual path-following algorithm for symmetric cone optimization. The algorithm further improves the complexity bound of a wide infeasible primal-dual path-following algorithm. The theory of Euclidean Jordan algebras is used to carry out our analysis. The convergence is shown for a commutative class of search directions. In particular, the complexity bound is 𝒪(r5/4log ϵ−1) for the Nesterov-Todd direction, and 𝒪(r7/4log ϵ−1) for the xs and sx directions, where r is the rank of the associated Euclidean Jordan algebra and ϵ is the required precision. If the starting point is strictly feasible, then the corresponding bounds can be reduced by a factor of r3/4. Some preliminary numerical results are provided as well.
Acknowledgments
We are grateful to the anonymous referees and editor for their useful comments that help us improve the presentation of this article.