Title :
Global convergence of the Heavy-ball method for convex optimization
Author :
Euhanna Ghadimi;Hamid Reza Feyzmahdavian;Mikael Johansson
Author_Institution :
Department of Automatic Control, School of Electrical Engineering and ACCESS Linnaeus Center, Royal Institute of Technology - KTH, Stockholm, Sweden
fDate :
7/1/2015 12:00:00 AM
Abstract :
This paper establishes global convergence and provides global bounds of the rate of convergence for the Heavy-ball method for convex optimization. When the objective function has Lipschitz-continuous gradient, we show that the Cesáro average of the iterates converges to the optimum at a rate of O(1/k) where k is the number of iterations. When the objective function is also strongly convex, we prove that the Heavy-ball iterates converge linearly to the unique optimum. Numerical examples validate our theoretical findings.
Keywords :
"Convergence","Convex functions","Linear programming","Algorithm design and analysis","Acceleration","Gradient methods","Radio frequency"
Conference_Titel :
Control Conference (ECC), 2015 European
DOI :
10.1109/ECC.2015.7330562
