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The existence of elliptic fibre space structures on Calabi–Yau threefolds, II
In [11], we considered the question of existence of elliptic fibre space structures on a smooth Calabi–Yau threefold X. Necessary conditions are that there exists a nef divisor D on X with D3=0; D2[nequiv ]0 and D·c2[ges ]0. In the case when D·c2[ges ]0, it was observed that a result from [9] implie...
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| Published in: | Mathematical proceedings of the Cambridge Philosophical Society 1998-03, Vol.123 (2), p.259-262, Article S030500419700220X |
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| Main Author: | |
| Format: | Article |
| Language: | English |
| Citations: | Items that cite this one |
| Online Access: | Get full text |
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| Summary: | In [11], we considered the question of existence
of elliptic
fibre space structures on
a smooth Calabi–Yau threefold X. Necessary conditions are
that
there exists a nef divisor D on X with
D3=0; D2[nequiv ]0 and
D·c2[ges ]0.
In the case when D·c2[ges ]0, it was
observed that a result from [9] implies that there is
an
elliptic fibre space structure
determined by D, and so [11] concerned itself
with the case when D·c2=0. In this
case, we were not able to deduce in general the existence of an elliptic
fibre space
structure, but only in the presence of a further condition. In particular,
it follows
from the Theorem in [11] that, if r denotes
the
number of rational surfaces E on X
with D[mid ]E≡0,
and if the Euler characteristic e(X)≠2r,
then some positive multiple
of D determines an elliptic fibre space structure on X
(the theorem in fact proves a
slightly stronger result, which gives the elliptic fibre space structure
if there is any
non-rational surface E on X with
D[mid ]E≡0). The purpose of this note
is to clarify the
meaning of the above rather mysterious condition on the
non-vanishing of e(X)/2−r. |
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| ISSN: | 0305-0041 1469-8064 |
| DOI: | 10.1017/S030500419700220X |