Title: Ryu, Malitsky-Tam, and Campoy splitting for normal cones of
linear subspaces

Heinz Bauschke

Abstract: Finding a zero of a sum of maximally monotone operators is a
classical problem in optimization and variational analysis. Recently,
new algorithms have been proposed  by Ryu, by Malitsky-Tam and by
Campoy. These algorithms do not utilize the standard product space
formulation. In this talk, the behaviour of these algorithms is
investigated for the case of normal cone operators of linear subspaces.

Based on joint work with Shambhavi Singh and Xianfu (Shawn) Wang.