Bordism computation for K(Z,3) identifies a new mixed perturbative anomaly in 5D and a new Z2 discrete anomaly in 7D for U(1) 1-form symmetries.
The Pontrjagin Dual of 4-Dimensional Spin Bordism
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abstract
The goal of this paper is to study the Pontrjagin dual of (reduced) 4-dimensional Spin bordism. That is to say, we consider the functor from the category of topological spaces to the category of compact abelian groups that associates to each space X the compact group of homomorphisms from the reduced 4-dimensional Spin bordism of X to the circle. In a previous paper, we studied the analogous problem for 3-dimensional Spin bordism. Our work was motivated by some questions from physics. The physicists are primarily interested in the case when X is the classifying space of a finite group, but our arguments are valid for general X. We describe the dual group, G(X), as equivalence classes of triples of cochains (w,p,a) on X, triples satisfying certain relations with a product. We also describe the pairing between such triples and a closed 4-dimensional Spin manifold mapping to X, the pairing that produces the identification of G(X) with the Pontrjagin dual of the reduced 4-dimensional Spin bordism of X.
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Stable cohomotopy in codimensions 2 and 3 receives complete algebraic characterizations for CW complexes and bordism interpretations for manifolds, yielding necessary and sufficient conditions for nowhere-vanishing vector bundle sections.
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On Quantum Aspects of 1-Form Symmetries II: Bordism, Invertible Phases, and Anomalies
Bordism computation for K(Z,3) identifies a new mixed perturbative anomaly in 5D and a new Z2 discrete anomaly in 7D for U(1) 1-form symmetries.
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Stable Cohomotopy in Codimensions Two and Three: From Algebraic Characterizations to Bordism-Theoretic Interpretations
Stable cohomotopy in codimensions 2 and 3 receives complete algebraic characterizations for CW complexes and bordism interpretations for manifolds, yielding necessary and sufficient conditions for nowhere-vanishing vector bundle sections.