Grassmann Clustering

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n(t) s(t) � A F. Theis x(t) main result: IV. <strong>Grassmann</strong> <strong>Clustering</strong> Centroid Calculation theorem: the centroid [Ci] of some cluster Bi is spanned by p eigenvectors corresponding to the smallest eigenvalues of the generalized cluster correlation 27 Apr 6, 2006 :: Tübingen
Page 1 and 2: n(t) s(t) � A x(t) Grassmann Clus
Page 3 and 4: n(t) s(t) � A F. Theis x(t) I. In
Page 9 and 10: n(t) s(t) � A F. Theis x(t) Examp
Page 11 and 12: n(t) s(t) � A F. Theis x(t) dimen
Page 13 and 14: n(t) s(t) � A F. Theis x(t) • s
Page 21 and 22: n(t) s(t) � A F. Theis x(t) „di
Page 29 and 30: n(t) s(t) � A F. Theis 3 x(t) hie
Page 32 and 33: n(t) s(t) � A F. Theis x(t) II. P
Page 34 and 35: n(t) s(t) � A F. Theis x(t) II. P
Page 36: n(t) s(t) � A F. Theis x(t) Eucli
Page 39: n(t) s(t) � A F. Theis x(t) III.
Page 43 and 44: n(t) s(t) � A F. Theis x(t) III.
Page 46 and 47: n(t) s(t) � A F. Theis x(t) IV. G
Page 50 and 51: n(t) s(t) � A F. Theis x(t) Proof
Page 52 and 53: n(t) s(t) � A F. Theis x(t) • c
Page 54 and 55: n(t) s(t) � A F. Theis x(t) Indet
Page 62 and 63: n(t) s(t) � A F. Theis • x(t) I
Page 64 and 65: n(t) s(t) � A F. Theis x(t) V. Su
Page 70 and 71: n(t) s(t) � A 2.5 2 1.5 1 0.5 0 -
Page 72 and 73: n(t) s(t) � A 3 2.5 2 1.5 1 F. Th
Page 74 and 75: n(t) s(t) � A F. Theis x(t) Concl

Grassmann Clustering

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