TY - JOUR
T1 - An extension of the proximal point algorithm beyond convexity
AU - Grad, Sorin Mihai
AU - Lara, Felipe
N1 - Publisher Copyright:
© 2021, The Author(s).
PY - 2022/2
Y1 - 2022/2
N2 - We introduce and investigate a new generalized convexity notion for functions called prox-convexity. The proximity operator of such a function is single-valued and firmly nonexpansive. We provide examples of (strongly) quasiconvex, weakly convex, and DC (difference of convex) functions that are prox-convex, however none of these classes fully contains the one of prox-convex functions or is included into it. We show that the classical proximal point algorithm remains convergent when the convexity of the proper lower semicontinuous function to be minimized is relaxed to prox-convexity.
AB - We introduce and investigate a new generalized convexity notion for functions called prox-convexity. The proximity operator of such a function is single-valued and firmly nonexpansive. We provide examples of (strongly) quasiconvex, weakly convex, and DC (difference of convex) functions that are prox-convex, however none of these classes fully contains the one of prox-convex functions or is included into it. We show that the classical proximal point algorithm remains convergent when the convexity of the proper lower semicontinuous function to be minimized is relaxed to prox-convexity.
KW - Generalized convex function
KW - Nonconvex optimization
KW - Nonsmooth optimization
KW - Proximal point algorithm
KW - Proximity operator
UR - https://www.scopus.com/pages/publications/85114340174
U2 - 10.1007/s10898-021-01081-4
DO - 10.1007/s10898-021-01081-4
M3 - Article
AN - SCOPUS:85114340174
SN - 0925-5001
VL - 82
SP - 313
EP - 329
JO - Journal of Global Optimization
JF - Journal of Global Optimization
IS - 2
ER -