Smoothness of the Augmented Lagrangian Dual in Convex Optimization

Abstract

This paper focuses on the general linearly constrained optimization problem: x ∈ Rd f(x) \ s.t. \ Ax = b, where f: Rd → R \+∞\ is a closed proper convex function, A ∈ Rp × d, and b ∈ Rp. We define the standard dual function ϕ(λ) = ∈fx \f(x) + λ, A x - b \, the augmented Lagrangian Lρ(x, λ) = f(x) + λ, Ax - b + ρ2\|Ax - b\|2 (ρ> 0), and the augmented Lagrangian dual function ϕρ(λ) = ∈fx Lρ(x, λ). Under the fundamental condition that dom \ ϕ≠ , we establish that: (1) ϕρ is 1ρ-smooth everywhere; and (2) the solution to x ∈ Rd Lρ(x, λ) exists for any λ∈ Rp. These theoretical findings substantially weaken the stringent assumptions typically imposed in the literature to ensure such properties.