TY - GEN
T1 - Linearly convergent evolution strategies via augmented Lagrangian constraint handling
AU - Atamna, Asma
AU - Auger, Anne
AU - Hansen, Nikolaus
N1 - Publisher Copyright:
© 2017 Copyright held by the owner/author(s).
PY - 2017/1/12
Y1 - 2017/1/12
N2 - We analyze linear convergence of an evolution strategy for constrained optimization with an augmented Lagrangian constraint handling approach. We study the case of multiple active linear constraints and use a Markov chain approach-used to analyze randomized optimization algorithms in the unconstrained case- to establish linear convergence under sufficient conditions. More specifically, we exhibit a class of functions on which a homogeneous Markov chain (defined from the state variables of the algorithm) exists and whose stability implies linear convergence. This class of functions is defined such that the augmented Lagrangian, centered in its value at the optimum and the associated Lagrange multipliers, is positive homogeneous of degree 2, and includes convex quadratic functions. Simulations of the Markov chain are conducted on linearly constrained sphere and ellipsoid functions to validate numerically the stability of the constructed Markov chain.
AB - We analyze linear convergence of an evolution strategy for constrained optimization with an augmented Lagrangian constraint handling approach. We study the case of multiple active linear constraints and use a Markov chain approach-used to analyze randomized optimization algorithms in the unconstrained case- to establish linear convergence under sufficient conditions. More specifically, we exhibit a class of functions on which a homogeneous Markov chain (defined from the state variables of the algorithm) exists and whose stability implies linear convergence. This class of functions is defined such that the augmented Lagrangian, centered in its value at the optimum and the associated Lagrange multipliers, is positive homogeneous of degree 2, and includes convex quadratic functions. Simulations of the Markov chain are conducted on linearly constrained sphere and ellipsoid functions to validate numerically the stability of the constructed Markov chain.
KW - Augmented Lagrangian
KW - Constrained optimization
KW - Evolution strategies
KW - Markov chain
KW - Randomized optimization algorithms
U2 - 10.1145/3040718.3040732
DO - 10.1145/3040718.3040732
M3 - Conference contribution
AN - SCOPUS:85018941450
T3 - FOGA 2017 - Proceedings of the 14th ACM/SIGEVO Conference on Foundations of Genetic Algorithms
SP - 149
EP - 161
BT - FOGA 2017 - Proceedings of the 14th ACM/SIGEVO Conference on Foundations of Genetic Algorithms
PB - Association for Computing Machinery, Inc
T2 - 14th ACM/SIGEVO Workshop on Foundations of Genetic Algorithms, FOGA 2017
Y2 - 12 January 2017 through 15 January 2017
ER -