This is the first appearance in the literature of the concept of a semismooth function. Semismooth functions are closed under addition and composition, and also guarantee the local convergence of nonsmooth generalizations of Newton's method.
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%0 Journal Article
%1 mifflin:semismooth
%A Mifflin, R.
%D 1977
%J Siam Journal on Control
%K imported
%P 957--972
%T Semismooth and semiconvex functions in constrained
optimization
%V 15
%Z This is the first appearance in the literature of the concept of a semismooth function. Semismooth functions are closed under addition and composition, and also guarantee the local convergence of nonsmooth generalizations of Newton's method.
@article{mifflin:semismooth,
added-at = {2009-07-30T01:17:14.000+0200},
annote = {This is the first appearance in the literature of the concept of a semismooth function. Semismooth functions are closed under addition and composition, and also guarantee the local convergence of nonsmooth generalizations of Newton's method.},
author = {Mifflin, R.},
biburl = {https://www.bibsonomy.org/bibtex/2f025b55684cd707362ab87c187b95edc/pitman},
description = {This is the description},
interhash = {7c28956db794f2a4f65df8538b2ba3b8},
intrahash = {f025b55684cd707362ab87c187b95edc},
journal = {Siam Journal on Control},
keywords = {imported},
pages = {957--972},
timestamp = {2009-07-30T01:17:15.000+0200},
title = {Semismooth and semiconvex functions in constrained
optimization},
volume = 15,
year = 1977
}