Tensor methods for strongly convex strongly concave saddle point problems and strongly monotone variational inequalities

Abstract

In this paper we propose three p-th order tensor methods for μ-strongly-convex-strongly-concave saddle point problems (SPP). The first method is based on the assumption of p-th order smoothness of the objective and it achieves a convergence rate of O ( ( Lp Rp - 1μ )2p + 1 μ R2G ), where R is an estimate of the initial distance to the solution, and G is the error in terms of duality gap. Under additional assumptions of first and second order smoothness of the objective we connect the first method with a locally superlinear converging algorithm and develop a second method with the complexity of O ( ( Lp Rp - 1μ )2p + 1 L2 R \ 1, L1μ \μ + L132 μ2 G L1 L2μ2 ). The third method is a modified version of the second method, and it solves gradient norm minimization SPP with O ( ( Lp Rp∇ )2p + 1 ) oracle calls, where ∇ is an error in terms of norm of the gradient of the objective. Since we treat SPP as a particular case of variational inequalities, we also propose three methods for strongly monotone variational inequalities with the same complexity as the described above.