Combinatorial quantization of 4d 2-Chern-Simons theory II: Quantum invariants of higher ribbons in D4

Abstract

This is a continuation of the first paper (arXiv:2501.06486) of this series, where the framework for the combinatorial quantization of the 4d 2-Chern-Simons theory with an underlying compact structure Lie 2-group G was laid out. In this paper, we continue our quest and characterize additive module *-functors ω:Cq(G^2)→Hilb, which serve as a categorification of linear *-functionals (ie. a state) on a C*-algebra. These allow us to construct non-Abelian Wilson surface correlations Cq(GP) on the discrete 2d simple polyhedra P partitioning 3-manifolds. By proving its stable equivalence under 3d handlebody moves, these Wilson surface states extend to decorated 3-dimensional marked bordisms in a 4-disc D4. This provides invariants of framed oriented 2-ribbonsin D4 from the data of the given compact Lie 2-group G. We find that these 2-Chern-Simons-type 2-ribbon invariants are given by bigraded Z-modules, similar to the lasagna skein modules of Manolescu-Walker-Wedrich.