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arxiv: 2309.08461 · v3 · pith:Y5P5DQEPnew · submitted 2023-09-15 · 🧮 math.QA · math-ph· math.GT· math.MP

Combed Trisection Diagrams and Non-Semisimple 4-Manifold Invariants

classification 🧮 math.QA math-phmath.GTmath.MP
keywords hopfinvariantnon-semisimpletrisectionalgebrasboundarymanifoldtriples
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Given a triple $H$ of (possibly non-semisimple) Hopf algebras equipped with pairings satisfying a set of properties, we describe a construction of an associated smooth, scalar invariant $\tau_H(X,\pi)$ of a simply connected, compact, oriented $4$-manifold $X$ and an open book $\pi$ on its boundary. This invariant generalizes an earlier semisimple version and is calculated using a trisection diagram $T$ for $X$ and a certain type of combing of the trisection surface. We explain a general calculation of this invariant for a family of exotic 4-manifolds with boundary called Stein nuclei, introduced by Yasui. After investigating many low-dimensional Hopf algebras up to dimension 11, we have not been able to find non-semisimple Hopf triples that satisfy the criteria for our invariant. Nonetheless, appropriate Hopf triples may exist outside the scope of our explorations.

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