Proximal smoothness of a set with the Lipschitz metric projection

On a convex set with nondifferentiable metric projection

A remarkable example of a nonempty closed convex set in the Euclidean plane for which the directional derivative of the metric projection mapping fails to exist was constructed by A. Shapiro. In this paper, we revisit and modify that construction to obtain a convex set with C boundary which possesses the same property.

Variable projection without smoothness

Variable projection is a powerful technique in optimization. Over the last 30 years, it has been applied broadly, with empirical and theoretical results demonstrating both greater efficacy and greater stability than competing approaches. In this paper, we illustrate the technique on a large class of structured nonsmooth optimization problems, with numerical examples in sparse deconvolution and ...

Bi-Lipschitz Decomposition of Lipschitz functions into a Metric space

We prove a quantitative version of the following statement. Given a Lipschitz function f from the k-dimensional unit cube into a general metric space, one can be decomposed f into a finite number of BiLipschitz functions f |Fi so that the k-Hausdorff content of f([0, 1] r ∪Fi) is small. We thus generalize a theorem of P. Jones [Jon88] from the setting of R to the setting of a general metric spa...

an investigation of the types of text reduction in subtitling: a case study of the persian film gilaneh with english subtitles

چکیده ندارد.

Metric Embeddings and Lipschitz Extensions