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• Krylov Subspace Dynamics as Near-Horizon AdS$_2$ Holography hep-th · 2026-02-12 · unverdicted · none · ref 37

  In the continuum limit the discrete Krylov chain becomes a Klein-Gordon field in AdS2, with Lanczos growth rate α identified as πT, recovering the maximal chaos bound and requiring the Breitenlohner-Freedman bound for consistency.

• Violation of Universal Operator Growth Hypothesis in $\mathcal{W}_3$Conformal Field Theories hep-th · 2025-06-02 · unverdicted · none · ref 25

  In W3 CFTs, Lanczos coefficients b_N grow as N^2 for generalized Liouvillian with W generators, violating the universal linear growth bound and causing divergent Krylov complexity, with the same quadratic growth in the SL(3,R) subalgebra.

• Toward Krylov-based holography in double-scaled SYK hep-th · 2025-10-26 · unverdicted · none · ref 36

  Establishes a threefold duality linking Krylov complexity growth rate to wormhole velocity and proper momentum in DSSYK holography, with higher moments capturing replica wormholes and Krylov entropy equaling parent-geometry von Neumann entropy after tracing baby universes.

• Finite cutoff JT gravity: Baby universes, Matrix dual, and (Krylov) Complexity hep-th · 2025-02-18 · unverdicted · none · ref 97

  Finite cutoff in JT gravity causes faster ERB-length saturation, deformation-dependent baby-universe emission only under Lorentzian evolution, and possible one-cut universality corrections in the matrix dual.

• Generalized CV Conjecture and Krylov Complexity in Two-Mode Hermitian Systems via Information Geometry hep-th · 2024-12-12 · unverdicted · none · ref 50

  Krylov complexity equals Fubini-Study volume for closed and open two-mode squeezed states, providing analytic support for the generalized CV conjecture via information geometry.