Backward error analysis and the qualitative behaviour of stochastic optimization algorithms: Application to stochastic coordinate descent
Di Giovacchino, Stefano, Higham, Desmond J., Zygalakis, Konstantinos
Stochastic optimization methods have been hugely successful in making large-scale optimization problems feasible when computing the full gradient is computationally prohibitive. Using the theory of modified equations for numerical integrators, we propose a class of stochastic differential equations that approximate the dynamics of general stochastic optimization methods more closely than the original gradient flow. Analyzing a modified stochastic differential equation can reveal qualitative insights about the associated optimization method. Here, we study mean-square stability of the modified equation in the case of stochastic coordinate descent.
Sep-5-2023
- Country:
- Europe
- United Kingdom
- Scotland > City of Edinburgh
- Edinburgh (0.04)
- England > Cambridgeshire
- Cambridge (0.14)
- Scotland > City of Edinburgh
- Italy > Abruzzo
- L'Aquila Province > L'Aquila (0.04)
- United Kingdom
- Europe
- Genre:
- Research Report (0.40)
- Technology: