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Structural Chirality from Inverse Semigroups to Twisted Groupoid $C^*$-Algebras

Takao Inoué

Abstract

We develop a structural theory of chirality for inverse semigroups and show how it propagates canonically to étale groupoids and twisted groupoid $C^*$-algebras. Starting from inverse semigroup data equipped with admissible twist information, we construct a canonical twisted universal groupoid in the sense of Paterson and introduce a mirror correspondence encoding intrinsic asymmetry. Our main result identifies a structural obstruction to mirror self-duality at the level of twisted universal groupoids and shows that this obstruction descends to an obstruction for the associated reduced twisted groupoid $C^*$-algebra to be isomorphic to its opposite. The framework is representation-independent, yet compatible with concrete germ groupoid models, and provides a unified bridge between partial symmetries, groupoid structures, and analytic invariants in noncommutative operator algebras.

Structural Chirality from Inverse Semigroups to Twisted Groupoid $C^*$-Algebras

Abstract

We develop a structural theory of chirality for inverse semigroups and show how it propagates canonically to étale groupoids and twisted groupoid -algebras. Starting from inverse semigroup data equipped with admissible twist information, we construct a canonical twisted universal groupoid in the sense of Paterson and introduce a mirror correspondence encoding intrinsic asymmetry. Our main result identifies a structural obstruction to mirror self-duality at the level of twisted universal groupoids and shows that this obstruction descends to an obstruction for the associated reduced twisted groupoid -algebra to be isomorphic to its opposite. The framework is representation-independent, yet compatible with concrete germ groupoid models, and provides a unified bridge between partial symmetries, groupoid structures, and analytic invariants in noncommutative operator algebras.
Paper Structure (39 sections, 19 theorems, 79 equations)

This paper contains 39 sections, 19 theorems, 79 equations.

Table of Contents

  1. Introduction
  2. Why universal groupoids?
  3. Related Work
  4. Organization of the paper.
  5. A Semigroup Warm-up: Decorated Semigroups and Isotopy
  6. Decorated Semigroups and Isotopisms
  7. Mirror Semigroup
  8. Transport of Mirror-Isotopisms
  9. Chirality Index
  10. Intrinsic Symmetry and Descent
  11. Structural Chirality for Inverse Semigroups with Representation
  12. Represented Inverse Semigroups
  13. Isotopisms of Represented Inverse Semigroups
  14. Mirror Representation
  15. Mirror-Isotopisms
  16. ...and 24 more sections

Key Result

Lemma 3.7

Let $h:(S,\Sigma)\to (T,\Lambda)$ be an isotopism. Then

Theorems & Definitions (84)

  • Remark 3.1
  • Definition 3.2: Decorated semigroup
  • Definition 3.3: Isotopism
  • Definition 3.4: Isotopy groupoid
  • Definition 3.5: Mirror semigroup
  • Definition 3.6: Mirror-isotopisms
  • Lemma 3.7: Transport
  • proof
  • Definition 3.8: Chirality index
  • Theorem 3.9: Structural vanishing criterion
  • ...and 74 more