A new transversality condition on orbifolds and integer-valued Gromov-Witten type invariants

TL;DR

This paper introduces a new transversality condition for orbifold sections, enabling the definition of integer-valued Gromov-Witten invariants and providing alternative proofs for existing theorems in symplectic topology.

Contribution

It proposes the FOP transversality condition for orbifold vector bundles, facilitating the construction of integral virtual cycles and invariants in symplectic geometry.

Findings

Defined integer-valued Gromov-Witten type invariants for all genera

Provided an alternative proof of the cohomological splitting theorem

Established a new transversality condition for orbifold sections

Abstract

Following a proposal of Fukaya-Ono and the exploration by B. Parker, we introduce a new transversality condition, the FOP transversality condition, for sections of orbifold vector bundles $\mathcal{E} \rightarrow \mathcal{U}$ when both $\mathcal{E}$ and $\mathcal{U}$ have "normal complex structures." This notion allows one to define various integral virtual cycles on moduli spaces of pseudoholomorphic curves. Two immediate applications in symplectic topology are the definition of integer-valued Gromov-Witten type invariants in all genera for general compact symplectic manifolds using the global Kuranishi chart constructed by Abouzaid-McLean-Smith and Hirschi-Swaminathan, and an alternative proof of the cohomological splitting theorem for Hamiltonian fibrations over $S^2$ with integer coefficients by Abouzaid-McLean-Smith.