Gravitational formulation of stress-tensor deformed field theories
Abstract
Stress-tensor deformations suggest a geometric origin of emergent gravity but are typically non-local for d>2. We couple a seed QFT to Einstein gravity with deformation parameter λ and evaluate the gravitational path integral at the metric saddle. Around a fixed reference background, the leading deformation is universal: a bilocal term quadratic in the stress tensor with kernel set by the graviton Green's function, plus a systematic higher-order expansion. Expressed on the saddle-point (deformed) metric, the flow becomes local. We then provide two constructive completions on deformed backgrounds--Palatini f(R) gravity and an eigenvalue method for general Ricci-based theories--and apply them to scalar generalized Nambu-Goto and T deformations (arbitrary d), two-dimensional multi-scalar ModMax and Born-Infeld models, and four-dimensional root-T T and T T flows of Maxwell theory yielding ModMax and Born-Infeld electrodynamics. In free field theory, an off-shell analysis further shows that the leading quantum correction generates an Einstein-Hilbert term with controlled higher-derivative terms.
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