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The Getzler-Gauss-Manin connection and Kontsevich-Soibelman operations on the periodic cyclic homology

Zihong Chen

Abstract

We study equivariant operations on the periodic cyclic homology of a dg algebra that arise from the chain level action of the two-colored Kontsevich-Soibelman operad. Using classical computations of Cohen [Coh], we explicitly compute a set of generators for these operations under composition, and show that they agree with the p-fold equivariant cap products previously studied by the author [Che2] in relation to equivariant Gromov-Witten theory with mod p coefficients. The main technical novelty is a re-formulation of the Kontsevich-Soibelman operad in terms of a two-colored version of the cacti operad, and a proof that it is equivariantly quasi-equivalent to the two-colored operad of little disks on a disk/cylinder. We give applications of the main results to symplectic topology, and more specifically, arithmetic aspects of Fukaya category and classical obstructions to realizing a middle cohomology class of a symplectic manifold by Lagrangian submanifold

The Getzler-Gauss-Manin connection and Kontsevich-Soibelman operations on the periodic cyclic homology

Abstract

We study equivariant operations on the periodic cyclic homology of a dg algebra that arise from the chain level action of the two-colored Kontsevich-Soibelman operad. Using classical computations of Cohen [Coh], we explicitly compute a set of generators for these operations under composition, and show that they agree with the p-fold equivariant cap products previously studied by the author [Che2] in relation to equivariant Gromov-Witten theory with mod p coefficients. The main technical novelty is a re-formulation of the Kontsevich-Soibelman operad in terms of a two-colored version of the cacti operad, and a proof that it is equivariantly quasi-equivalent to the two-colored operad of little disks on a disk/cylinder. We give applications of the main results to symplectic topology, and more specifically, arithmetic aspects of Fukaya category and classical obstructions to realizing a middle cohomology class of a symplectic manifold by Lagrangian submanifold
Paper Structure (33 sections, 58 theorems, 315 equations, 34 figures)

This paper contains 33 sections, 58 theorems, 315 equations, 34 figures.

Key Result

Theorem 1.1

Figures (34)

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Theorems & Definitions (105)

  • Theorem 1.1
  • Theorem 1.2
  • Theorem 1.3
  • Remark 1.4
  • Corollary 1.5
  • Theorem 1.6
  • Theorem 1.7
  • Remark 1.8
  • Definition 2.1
  • Definition 2.2
  • ...and 95 more