| Abstract: | We consider the problem of finding a point in the intersection of an affine set with a compact convex set, called a convex linear system (CLS). The conditional gradient method is known to exhibit a sublinear rate of convergence. Exploiting the special structure of (CLS), we prove that the conditional gradient method applied to the equivalent minimization formulation of (CLS), converges to a solution at a linear rate, under the sole assumption that Slater s condition holds for (CLS). The rate of convergence is measured explicitly in terms of the problems data and a Slater point. Application to a class of conic linear systems is discussed.Acknowldegements. We thank two referees for their constructive comments which has led to improve the presentation. |
