Symplectic fixed points and Lagrangian intersections on weighted projective spaces

Details Symplectic fixed points and Lagrangian intersections on weighted projective spaces Symplectic fixed points and Lagrangian intersections on weighted projective spaces

2006-01-12

arxiv.org/abs/math/0601281v1

Mathematics

Symplectic Geometry

Latex, 14 pages

Scientific paper

In this note we observe that Arnold conjecture for the Hamiltonian maps still
holds on weighted projective spaces $\CP^n({\bf q})$, and that Arnold
conjecture for the Lagrange intersections for $(\CP^n({\bf q}), \RP^n({\bf
q}))$ is also true if each weight $q_i\in {\bf q}=\{q_1,..., q_{n+1}\}$ is odd.

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