View PDF - Project Euclid
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View PDF - Project Euclid
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486 PHILLIP A. GRIFFITHS<br />
is the pullback to 0() of the standard form o<br />
2<br />
0 log[z[[<br />
on IPN 1--for a proof cf. the reference given in footnote (4) of the introduction.<br />
Now let//C IPN be a complex manifold. For a point Z0 /9/we recall<br />
that the projective tangent space to/f/at 20 is the pn<br />
Z0 obtained as the limiting<br />
position of chordso as 2 M tends to 0. We define (2f/) C 0() to be<br />
the flames {Z0, ", ZN- 1} where<br />
The picture for an analytic curve in IW is<br />
We shall use the range of indices<br />
Since on<br />
n;<br />
0
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