English

A Sharp Compactness Theorem for Genus-One Pseudo-Holomorphic Maps

Symplectic Geometry 2014-11-11 v3

Abstract

For each compact almost Kahler manifold (X,\om,J)(X,\om,J) and an element A of H2(X;Z)H_2(X;Z), we describe a closed subspace \ovM1,k0(X,A;J)\ov{\frak M}_{1,k}^0(X,A;J) of the moduli space \ovM1,k(X,A;J)\ov{\frak M}_{1,k}(X,A;J) of stable J-holomorphic genus-one maps such that \ovM1,k0(X,A;J)\ov{\frak M}_{1,k}^0(X,A;J) contains all stable maps with smooth domains. If (Pn,\om,J0)(P^n,\om,J_0) is the standard complex projective space, \ovM1,k0(Pn,A;J0)\ov{\frak M}_{1,k}^0(P^n,A;J_0) is an irreducible component of \ovM1,k(Pn,A;J0)\ov{\frak M}_{1,k}(P^n,A;J_0). We also show that if an almost complex structure JJ on PnP^n is sufficiently close to J_0, the structure of the space \ovM1,k0(Pn,A;J)\ov{\frak M}_{1,k}^0(P^n,A;J) is similar to that of \ovM1,k0(Pn,A;J0)\ov{\frak M}_{1,k}^0(P^n,A;J_0). This paper's compactness and structure theorems lead to new invariants for some symplectic manifolds, which are generalized to arbitrary symplectic manifolds in a separate paper. Relatedly, the smaller moduli space \ov\M1,k0(X,A;J)\ov\M_{1,k}^0(X,A;J) is useful for computing the genus-one Gromov-Witten invariants, which arise from the larger moduli space \ov\M1,k(X,A;J)\ov\M_{1,k}(X,A;J).

Keywords

Cite

@article{arxiv.math/0406103,
  title  = {A Sharp Compactness Theorem for Genus-One Pseudo-Holomorphic Maps},
  author = {Aleksey Zinger},
  journal= {arXiv preprint arXiv:math/0406103},
  year   = {2014}
}

Comments

two errors corrected; 78 pages, 7 figures