Algebraic planar torsion in contact manifolds

Abstract

We demonstrate that the functorial properties of the symplectic field theory under strong cobordisms and surgery cobordisms can produce finite algebraic (planar) torsions from simple examples, which gives a unified treatment of most of the known computations of algebraic (planar) torsions. In addition, we obtain many families of new examples, notably including (1) stably fillable examples in all dimensions $\ge 5$ with algebraic (planar) torsion precisely $k$ for any given $k\in \mathbb{N}_+$, confirming a conjecture of Latschev and Wendl; (2) contact structures on spheres of all dimensions at least $5$ with finite algebraic planar torsion at least $1$, which implies that tight not weakly fillable contact structures are ubiquitous in higher dimensions. We also explain that all known examples of contact manifolds without strong/weak fillings in dimension $\ge 5$ have algebraic planar torsion.

Figures (6)

• Figure 1: A forest of labeled trees
• Figure 2: Gluing forests $\Leftrightarrow$ applying operations
• Figure 3: A component of $\widehat{\phi}$ from $S^3V \odot S^3 V \odot S^2 V$ to $S^6V^\prime$
• Figure 4: A component of $p^{1,6}_{\mathfrak{mc}}$
• Figure :

Theorems & Definitions (128)

• Theorem 1
• Conjecture 1.2: Latschev--Wendl LW
• Theorem 2
• Theorem 3
• Remark 1.3
• Definition 1.4
• Theorem 4
• Theorem 5
• Theorem 6
• Definition 2.1