The Holography of Spread Complexity: A Story of Observers
Abstract
Building on the pioneering work of Caputa:2024sux, we propose a holographic description of spread complexity and its rate in 2D CFTs. By exploiting SL(2,R) symmetry, we explicitly construct the Krylov basis, expressing spread complexity as a linear combination of generator expectation values. Within the AdS/CFT correspondence, we translate these boundary expectations directly into bulk kinematic variables. These findings suggest that spread complexity manifests as the energy measured by a bulk observer, with its rate corresponding to the radial momentum.
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