Nidhi Sudhir scite author profile

We study complex saddles of the Lorentzian path integral for 4D axion gravity and its dual description in terms of a 3-form flux, which include the Giddings-Strominger Euclidean wormhole. Transition amplitudes are computed using the Lorentzian path integral and with the help of Picard-Lefschetz theory. The number and nature of saddles is shown to qualitatively change in the presence of a bilocal operator that could arise, for example, as a result of considering higher-topology transitions. We also analyze the stability of the Giddings-Strominger wormhole in the 3-form picture, where we find that it represents a perturbatively stable Euclidean saddle of the gravitational path integral. This calls into question the ultimate fate of such solutions in an ultraviolet-complete theory of quantum gravity.

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All order exact result for the anomalous dimension of the scalar primary in Chern-Simons vector models

Jain

Malvimat

Mehta

et al. 2020

Phys. Rev. D

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We present a conjecture for the leading 1=N anomalous dimension of the scalar primary operator in UðNÞ k Chern-Simons theories coupled to a single fundamental field, to all orders in the t'Hooft coupling λ ¼ N k. Following this we compute the anomalous dimension of the scalar in a Regular Bosonic theory perturbatively at two-loop order and demonstrate that matches exactly with the result predicted by our conjecture. We also show that our proposed expression for the anomalous dimension is consistent with all other existing two-loop perturbative results, which constrain its form at both weak and strong coupling thanks to the bosonization duality. Furthermore, our conjecture passes a novel nontrivial all loop test which provides a strong evidence for its consistency.

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Nidhi Sudhir

Complex saddles and Euclidean wormholes in the Lorentzian path integral

All order exact result for the anomalous dimension of the scalar primary in Chern-Simons vector models

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