Trade-off Invariance Principle for minimizers of regularized functionals

Abstract

In this paper, we consider functionals of the form Hα(u)=F(u)+α G(u) with α∈[0,+∞), where u varies in a set U≠ (without further structure). We first revisit a result stating that, excluding at most countably many values of α, we have ∈fHαG= HαG, where Hα := UHα, which is assumed to be non-empty. Then, we prove a stronger result that concerns the invariance of the limiting value of the functional G along minimizing sequences for Hα, which extends the above Principle to the case Hα= . Moreover, we show to what extent these findings generalize to multi-regularized functionals and -- in the presence of an underlying differentiable structure -- to critical points. Finally, the main result implies an unexpected consequence for functionals regularized with uniformly convex norms: excluding again at most countably many values of α, it turns out that for a minimizing sequence, convergence to a minimizer in the weak or strong sense is equivalent.

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