Least Squares Problems with Absolute Quadratic Constraints
Keyword(s):
This paper analyzes linear least squares problems with absolute quadratic constraints. We develop a generalized theory following Bookstein's conic-fitting and Fitzgibbon's direct ellipse-specific fitting. Under simple preconditions, it can be shown that a minimum always exists and can be determined by a generalized eigenvalue problem. This problem is numerically reduced to an eigenvalue problem by multiplications of Givens' rotations. Finally, four applications of this approach are presented.
1980 ◽
Vol 34
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pp. 69-83
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1987 ◽
Vol 8
(5)
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pp. 716-733
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Keyword(s):
Keyword(s):
1979 ◽
Vol 33
(145)
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pp. 171-183
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2017 ◽
Vol 43
(4)
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pp. 1-35
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