English

On Symplectic Packing Problems in Higher Dimensions

Symplectic Geometry 2023-12-21 v1 Geometric Topology

Abstract

Let B2n(R)B^{2n}(R) denote the closed 2n2n-dimensional symplectic ball of area RR, and let Σg(L)\Sigma_g(L) be a closed symplectic surface of genus gg and area LL. We prove that there is a symplectic embedding i=1kB4(Ri)×Σg(L)sint(B4(R))×Σg(L)\bigsqcup_{i=1}^k B^4(R_i) \times \Sigma_g (L) \overset{s}\hookrightarrow \operatorname{int}(B^4(R))\times \Sigma_g (L) if and only if there exists a symplectic embedding i=1kB4(Ri)sint(B4(R))\bigsqcup_{i=1}^k B^4(R_i) \overset{s}\hookrightarrow \mathrm{int}(B^4(R)). This lies in contrast with the standard higher dimensional ball packing problem i=1kB2n(Ri)sint(B2n(R))\bigsqcup\limits_{i=1}^k B^{2 n}(R_i)\overset{s}\hookrightarrow \mathrm{int}(B^{2n}(R)) for n>2n >2, which we conjecture (based on index behavior for pseudoholomorphic curves) is controlled entirely by Gromov's two ball theorem and volume considerations. We also deduce analogous results for stabilized embeddings of concave toric domains into convex domains, and we establish a stabilized version of Gromov's two ball theorem which holds in any dimension. Our main tools are: (i) the symplectic blowup construction along symplectic submanifolds, (ii) an h-principle for symplectic surfaces in high dimensional symplectic manifolds, and (iii) a stabilization result for pseudoholomorphic holomorphic curves of genus zero.

Keywords

Cite

@article{arxiv.2312.13224,
  title  = {On Symplectic Packing Problems in Higher Dimensions},
  author = {Kyler Siegel and Yuan Yao},
  journal= {arXiv preprint arXiv:2312.13224},
  year   = {2023}
}

Comments

25 pages, no figures, comments welcome!

R2 v1 2026-06-28T13:57:50.033Z