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Communications in Number Theory and Physics
Volume 1 (2007)
Number 4
On equivariant mirror symmetry for local $\p^2$
Pages: 729 – 760
DOI: https://dx.doi.org/10.4310/CNTP.2007.v1.n4.a5
Authors
Abstract
We solve the problem of equivariant mirror symmetry for$K_{\p^2}=\oo(-3)\rightarrow \p^2$ for the (three) cases of one independentequivariant parameter. This gives a decomposition of mirror symmetry for$K_{\p^2}$ into that of three subspaces, each of which may be consideredindependently. Finally, we give a new interpretation ofmirror symmetry for $\oo(k)\oplus \oo(-2-k)\rightarrow \p^1$.
Published 1 January 2007