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Krylov Complexity in Supersymmetric Large-$N$ Quantum Mechanics

2 Pith papers cite this work. Polarity classification is still indexing.

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abstract

We study Krylov complexity in the large-$N$ planar limit of the supersymmetric matrix quantum mechanical Veneziano--Wosiek model. In particular, we discuss the special features emerging at the critical transition at the 't~Hooft coupling $\lambda=1$. Starting from selected states in the sectors with fermion number 0 and 1, related by supersymmetry, we analyze the time dependence of Krylov complexity by numerical methods. We find that for $\lambda\neq1$ the Krylov complexity $K(t)$ exhibits oscillatory behavior, while at the critical coupling $\lambda=1$ it grows quadratically in time, $K(t)\sim t^2$, with sector-dependent amplitudes. To obtain analytical insight, we study in the bosonic sector a solvable model with $\mathfrak{sl}(2, \mathbb{R})$ symmetry which is a rank-1 modification of the Veneziano--Wosiek Hamiltonian, finding that it reproduces the previous features of complexity. We also introduce supercharges and extend the solvable model to the fermionic sector where we also compute analytically the Krylov complexity. Higher degree-$M$ Krylov complexities, defined as expectation values of powers of Lanczos index, are also computed and grow polynomially in time $\sim t^{2M}$ at the critical point both in the original and in the solvable model. This behavior is closely analogous to the spreading of a localized squeezed state in a one-dimensional quantum harmonic oscillator of frequency $\omega$, with the free limit $\omega\to 0$ corresponding to the critical $\lambda\to 1$ limit.

fields

hep-th 2

years

2026 2

verdicts

UNVERDICTED 2

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representative citing papers

Holographic Spread Complexity from Branes and Strings

hep-th · 2026-06-30 · unverdicted · novelty 6.0

D0-branes in ABJM, rotating D3-branes, and wound strings realize holographic spread complexity via proper momentum and Routhian prescriptions that match short-time Krylov behavior.

Controlled Chaos in 4D SCFTs

hep-th · 2026-06-22 · unverdicted · novelty 6.0

Orbifolds of N=4 SYM produce SCFTs whose dilatation operator in a subsector is realized by a tunable spin chain whose eigenvalue statistics exhibit chaos for specific marginal couplings.

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Showing 2 of 2 citing papers after filters.

  • Holographic Spread Complexity from Branes and Strings hep-th · 2026-06-30 · unverdicted · none · ref 17 · internal anchor

    D0-branes in ABJM, rotating D3-branes, and wound strings realize holographic spread complexity via proper momentum and Routhian prescriptions that match short-time Krylov behavior.

  • Controlled Chaos in 4D SCFTs hep-th · 2026-06-22 · unverdicted · none · ref 63 · internal anchor

    Orbifolds of N=4 SYM produce SCFTs whose dilatation operator in a subsector is realized by a tunable spin chain whose eigenvalue statistics exhibit chaos for specific marginal couplings.