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Paper detail

A geometric Newton method for Oja's vector field

Newton's method for solving the matrix equation $F(X)\equiv AX-XX^TAX=0$ runs up against the fact that its zeros are not isolated. This is due to a symmetry of $F$ by the action of the orthogonal group. We show how differential-geometric techniques can be exploited to remove this symmetry and obtain a ``geometric'' Newton algorithm that finds the zeros of $F$. The geometric Newton method does not suffer from the degeneracy issue that stands in the way of the original Newton method.

preprint2008arXivOpen access
P. -A. AbsilM. IshtevaL. De LathauwerS. Van Huffel
math.NA
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P. -A. AbsilM. IshtevaL. De LathauwerS. Van Huffel

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