Relating Hodge Atoms, Spectral Triples, and BPS Flows

Abstract

We compare algebraic and analytic pictures relevant to the study of birational invariants. Motivated by recent advances in the development of non-commutative Hodge structures, we examine their implication for quiver gauge field theory on the cubic fourfold. By interpreting the semiorthogonal property as a dynamical selection rule, we conjecture that the K3 Hodge atom of the cubic fourfold represents a protected quantum phase whose spectra remain invariant under non-perturbative tunneling processes.

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