TY - JOUR
T1 - An efficient convexification method for solving generalized geometric problems
AU - Lu, Hao Chun
PY - 2012/5
Y1 - 2012/5
N2 - Convexification transformation is vital for solving Generalized Geometric Problems (GGP) in global optimization. Björk et al. [3] posited that transforming non-convex signomial terms in a GGP into 1-convex functions is currently the most efficient convexification technique. However, to the best of our knowledge, an efficient convexification method based on the concept of 1-convex functions has not been proposed. To address this research gap, we present a Beta method to maximally improve the efficiency of convexification based on the concept of 1-convex functions, and thereby enhance the accuracy of linearization without increasing the number of break points and binary variables in the piecewise linear function. The Beta method yields an excellent solution quality and computational efficiency. We compare its performance, with that of three existing approaches using four numerical examples. The computational results demonstrate that, in terms of solution quality and computation time, the proposed method outperforms the compared approaches.
AB - Convexification transformation is vital for solving Generalized Geometric Problems (GGP) in global optimization. Björk et al. [3] posited that transforming non-convex signomial terms in a GGP into 1-convex functions is currently the most efficient convexification technique. However, to the best of our knowledge, an efficient convexification method based on the concept of 1-convex functions has not been proposed. To address this research gap, we present a Beta method to maximally improve the efficiency of convexification based on the concept of 1-convex functions, and thereby enhance the accuracy of linearization without increasing the number of break points and binary variables in the piecewise linear function. The Beta method yields an excellent solution quality and computational efficiency. We compare its performance, with that of three existing approaches using four numerical examples. The computational results demonstrate that, in terms of solution quality and computation time, the proposed method outperforms the compared approaches.
KW - 1-convex function
KW - Convex underestimator
KW - Convexication
KW - Geometric programming
KW - Power convex transformation
UR - http://www.scopus.com/inward/record.url?scp=84861778403&partnerID=8YFLogxK
U2 - 10.3934/jimo.2012.8.429
DO - 10.3934/jimo.2012.8.429
M3 - Article
AN - SCOPUS:84861778403
SN - 1547-5816
VL - 8
SP - 429
EP - 455
JO - Journal of Industrial and Management Optimization
JF - Journal of Industrial and Management Optimization
IS - 2
ER -