Exploiting Sparsity in Semidefinite Programming via Matrix Completion I: General Framework 论文

摘要

. A critical disadvantage of primal-dual interior-point methods compared to dual interior-point methods for large scale SDPs (semidefinite programs) has been that the primal positive semidefinite matrix variable becomes fully dense in general even when all data matrices are sparse. Based on some fundamental results about positive semidefinite matrix completion, this article proposes a general method of exploiting the aggregate sparsity pattern over all data matrices to overcome this disadvantage. Our method is used in two ways. One is a conversion of a sparse SDP having a large scale positive semidefinite matrix variable into an SDP having multiple but smaller size positive semidefinite matrix variables to which we can e#ectively apply any interior-point method for SDPs employing a standard block-diagonal matrix data structure. The other way is an incorporation of our method into primal-dual interior-point methods which we can apply directly to a given SDP. In Part II of this article, ...