Degenerations of LeBrun twistor spaces
Abstract
We investigate various limits of the twistor spaces associated to the self-dual metrics on n CP 2, the connected sum of the complex projective planes, constructed by C. LeBrun. In particular, we explicitly present the following 3 kinds of degenerations whose limits of the metrics are: (a) LeBrun metrics on (n-1) CP 2$, (b) (Another) LeBrun metrics on the total space of the line bundle O(-n) over CP 1 (c) The hyper-Kaehler metrics on the small resolution of rational double points of type An-1, constructed by Gibbons and Hawking.
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