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202320242025093
Abstract: (arXiv)
The CPT theorem states that a unitary and Lorentz-invariant theory must also be invariant under a discrete symmetry CRT\mathbf{CRT} which reverses charge, time, and one spatial direction. In this article, we study a Z2×Z2\mathbb{Z}_2 \times \mathbb{Z}_2 symmetry group, in which two of the nontrivial symmetries (``Reflection Reality'' and a 180 degree rotation) are implied by Unitarity and Lorentz Invariance respectively, while the third is CRT\mathbf{CRT}. (In cosmology, Scale Invariance plays the role of Lorentz Invariance.) This naturally leads to converses of the CPT theorem, as any two of the discrete Z2\mathbb{Z}_2 symmetries will imply the third one. Furthermore, in many field theories, the Reflection Reality Z2\mathbb{Z}_2 symmetry is actually sufficient to imply the theory is fully unitary, over a generic range of couplings. Building upon previous work on the Cosmological Optical Theorem, we derive non-perturbative reality conditions associated with bulk Reflection Reality (in all flat FLRW models) and CRT\mathbf{CRT} (in de Sitter spacetime), in arbitrary dimensions. Remarkably, this CRT\mathbf{CRT} constraint suffices to fix the phase of all wavefunction coefficients at future infinity (up to a real sign) -- without requiring any analytic continuation, or comparison to past infinity -- although extra care is required in cases where the bulk theory has logarithmic UV or IR divergences. This result has significant implications for de Sitter holography, as it allows us to determine the phases of arbitrary nn-point functions in the dual CFT.
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