A Newton-CG based barrier method for finding a second-order stationary point of nonconvex conic optimization with complexity guarantees
Abstract
In this paper we consider finding an approximate second-order stationary point (SOSP) of nonconvex conic optimization that minimizes a twice differentiable function over the intersection of an affine subspace and a convex cone. In particular, we propose a Newton-conjugate gradient (Newton-CG) based barrier method for finding an (ε,ε)-SOSP of this problem. Our method is not only implementable, but also achieves an iteration complexity of O(ε-3/2), which matches the best known iteration complexity of second-order methods for finding an (ε,ε)-SOSP of unconstrained nonconvex optimization. The operation complexity, consisting of O(ε-3/2) Cholesky factorizations and O(ε-3/2\n,ε-1/4\) other fundamental operations, is also established for our method.
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