Mathematical Research Letters
Volume 11, Issue 1, January 2004 pp. 13-22.
On Lens Spaces and Their Symplectic FillingsAuthors: Paolo Lisca
Author institution: Università di Pisa
Summary: The standard contact structure $\xi_0$ on the three--sphere $S^3$ is invariant under the action of $\mathbb Z/p\mathbb Z$ yielding the lens space $L(p,q)$, therefore every lens space carries a natural quotient contact structure $\overline\xi_0$. A theorem of Eliashberg and McDuff classifies the symplectic fillings of ($L(p,1),{\overline\xi_0})$ up to diffeomorphism. Here we announce a generalization of that result to every lens space. In particular, we give an explicit handlebody decomposition of every symplectic filling of $(L(p,q),{\overline\xi_0})$ for every $p$ and $q$. Our results imply:
(a) There exist infinitely many lens spaces $L(p,q)$ with $q\not= 1$ such that the contact 3--manifold $(L(p,q),{\overline\xi_0})$ admits only one symplectic filling up to blowups and diffeomorphisms.
(b) For any natural number $N$, there exist infinitely many lens spaces $L(p,q)$ such that $(L(p,q),{\overline\xi_0})$ admits more than $N$ symplectic fillings up to blowups and diffeomorphisms.
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