(B14), by exploiting the fact that Hilbert space of SSH model is two dimensional

Spread complexity for a general reference state for SSH In this section we are going to evaluate the Krylov spread complexity for the ground state of SSH model Eq

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Krylov complexity and fidelity susceptibility in two-band Hamiltonians

quant-ph · 2026-05-18 · unverdicted · novelty 5.0

Derivative of Krylov spread complexity diverges logarithmically at SSH topological transitions and is bounded by fidelity susceptibility in general two-band Hamiltonians, with a non-unitary duality between phases.

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Krylov complexity and fidelity susceptibility in two-band Hamiltonians quant-ph · 2026-05-18 · unverdicted · none · ref 61
Derivative of Krylov spread complexity diverges logarithmically at SSH topological transitions and is bounded by fidelity susceptibility in general two-band Hamiltonians, with a non-unitary duality between phases.

(B14), by exploiting the fact that Hilbert space of SSH model is two dimensional

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