Marginal minimization and sup-norm expansions in perturbed optimization

Abstract

Let the objective unction \( f \) depends on the target variable \( x \) along with a nuisance variable \( s \): \( f(v) = f(x,s) \). The goal is to identify the marginal solution \( x* = x s f(x,s) \). This paper discusses three related problems. The plugin approach widely used e.g. in inverse problems suggests to use a preliminary guess (pilot) \( s \) and apply the solution of the partial optimization \( x = x f(x,s) \). The main question to address within this approach is the required quality of the pilot ensuring the prescribed accuracy of \( x \). The popular alternating optimization approach suggests the following procedure: given a starting guess \( x0 \), for \( t ≥ 1 \), define \( st = s f(xt-1,s) \), and then \( xt = x f(x,st) \). The main question here is the set of conditions ensuring a convergence of \( xt \) to \( x* \). Finally, the paper discusses an interesting connection between marginal optimization and sup-norm estimation. The basic idea is to consider one component of the variable \( v \) as a target and the rest as nuisance. In all cases, we provide accurate closed form results under realistic assumptions. The results are illustrated by one numerical example for the BTL model.