Abstract
We focus on nonconvex and non-smooth block optimization problems, where the smooth coupling part of the objective does not satisfy a global/partial Lipschitz gradient continuity assumption. A general alternating minimization algorithm is proposed that combines two proximal-based steps, one classical and another with respect to the Bregman divergence. Combining different analytical techniques, we provide a complete analysis of the behavior—from global to local—of the algorithm, and show when the iterates converge globally to critical points with a locally linear rate for sufficiently regular (though not necessarily convex) objectives. Numerical experiments illustrate the theoretical findings.
| Original language | English |
|---|---|
| Pages (from-to) | 33-55 |
| Number of pages | 23 |
| Journal | Journal of Global Optimization |
| Volume | 89 |
| Issue number | 1 |
| DOIs | |
| State | Published - May 2024 |
Keywords
- 49M20
- 65K05
- 65K10
- 90C26
- Alternating minimization
- Bregman proximal splitting
- Nonconvex and non-smooth minimization
- Primary 49J52
- Quadratic optimization
- Secondary 47H09
All Science Journal Classification (ASJC) codes
- Control and Optimization
- Applied Mathematics
- Business, Management and Accounting (miscellaneous)
- Computer Science Applications
- Management Science and Operations Research