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Chain duality for categories over complexes

James F. Davis, Carmen Rovi

Abstract

We show that the additive category of chain complexes parametrized by a finite simplicial complex $K$ forms a category with chain duality. This fact, never fully proven in the original reference, is fundamental for Ranicki's algebraic formulation of the surgery exact sequence of Sullivan and Wall, and his interpretation of the surgery obstruction map as the passage from local Poincaré duality to global Poincaré duality. Our paper also gives a new, conceptual, and geometric treatment of chain duality on $K$-based chain complexes.

Chain duality for categories over complexes

Abstract

We show that the additive category of chain complexes parametrized by a finite simplicial complex forms a category with chain duality. This fact, never fully proven in the original reference, is fundamental for Ranicki's algebraic formulation of the surgery exact sequence of Sullivan and Wall, and his interpretation of the surgery obstruction map as the passage from local Poincaré duality to global Poincaré duality. Our paper also gives a new, conceptual, and geometric treatment of chain duality on -based chain complexes.
Paper Structure (6 sections, 22 theorems, 81 equations, 4 figures)

This paper contains 6 sections, 22 theorems, 81 equations, 4 figures.

Key Result

Theorem 1

The following are additive categories with chain duality

Figures (4)

  • Figure 1: Dual cells and $K$- and $K^{\mathop{\mathrm{op}}\nolimits}$-dissections of a 2-simplex
  • Figure 2: $K$- and $K^{\mathop{\mathrm{op}}\nolimits}$-dissections
  • Figure 3: $\sigma_C$ (blue) and $L_{\tau} \sigma$ (red)
  • Figure 4: Orientation of dual cells in a 2-simplex

Theorems & Definitions (61)

  • Theorem 1
  • Definition 2
  • Remark 3
  • Lemma 4
  • proof
  • Definition 5
  • Definition 6
  • Definition 7
  • Definition 8
  • Definition 9
  • ...and 51 more