Necessary and sufficient conditions of solution uniqueness in 1 minimization

Abstract

This paper shows that the solutions to various convex 1 minimization problems are unique if and only if a common set of conditions are satisfied. This result applies broadly to the basis pursuit model, basis pursuit denoising model, Lasso model, as well as other 1 models that either minimize f(Ax-b) or impose the constraint f(Ax-b)≤σ, where f is a strictly convex function. For these models, this paper proves that, given a solution x* and defining I=(x*) and s=(x*I), x* is the unique solution if and only if AI has full column rank and there exists y such that AITy=s and |aiTy|∞<1 for i∈ I. This condition is previously known to be sufficient for the basis pursuit model to have a unique solution supported on I. Indeed, it is also necessary, and applies to a variety of other 1 models. The paper also discusses ways to recognize unique solutions and verify the uniqueness conditions numerically.