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No boundary density matrix in elliptic de Sitter dS/$\mathbb{Z}_2$

hep-th · 2025-11-30 · unverdicted · novelty 6.0

The Euclidean path integral on elliptic de Sitter defines a no-boundary density matrix whose entropies reduce to vertex operator correlators on non-orientable surfaces, with a one-dimensional global Hilbert space but nontrivial observer Fock spaces.

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No boundary density matrix in elliptic de Sitter dS/$\mathbb{Z}_2$ hep-th · 2025-11-30 · unverdicted · none · ref 60
The Euclidean path integral on elliptic de Sitter defines a no-boundary density matrix whose entropies reduce to vertex operator correlators on non-orientable surfaces, with a one-dimensional global Hilbert space but nontrivial observer Fock spaces.

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