A Method of Analytic Centers for Quadratically Constrained Convex Quadratic Programs
Citation
Source Title
DOI
ISSN
Faculty
School
Collection
Abstract
An interior point method is developed for maximizing a concave quadratic function order convex quadratic constraints. The algorithm constructs a sequence of nested convex sets and finds their approximate centers using a partial Newton step. Given the first convex set and its approximate center, the total arithmetic operations required to converge to an approximate solution are of order O(√m(m + n)n2 ln ε), where m is the number of constraints, n is the number of variables, and ε is determined by the desired tolerance of the optimal value and the size of the first convex set. A method to initialize the algorithm is also proposed so that the algorithm can start from an arbitrary (perhaps infeasible) point.
Related items
Showing items related by title, author, creator and subject.
-
Ruan, Ning (2012)Duality is one of the most successful ideas in modern science [46] [91]. It is essential in natural phenomena, particularly, in physics and mathematics [39] [94] [96]. In this thesis, we consider the canonical duality ...
-
Tuthill, John D. (1995)In antenna array processing it is generally required to enhance the reception or detection of a signal from a particular direction while suppressing noise and interference signals from other directions. An optimisation ...
-
Mardaneh, Elham (2010)Many industries are beginning to use innovative pricing techniques to improve inventory control, capacity utilisation, and ultimately the profit of the firm. In manufacturing, the coordination of pricing and production ...