A faster dual algorithm for the Euclidean minimum covering ball problem
Abstract
Dearing and Zeck presented a dual algorithm for the problem of the minimum covering ball in Rn. Each iteration of their algorithm has a computational complexity of at least O(n3). In this paper we propose a modification to their algorithm that, together with an implementation that uses updates to the QR factorization of a suitable matrix, achieves a O(n2) iteration.
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