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Optimization of the derivative expansion in the nonperturbative renormalization group

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

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abstract

We study the optimization of nonperturbative renormalization group equations truncated both in fields and derivatives. On the example of the Ising model in three dimensions, we show that the Principle of Minimal Sensitivity can be unambiguously implemented at order $\partial^2$ of the derivative expansion. This approach allows us to select optimized cut-off functions and to improve the accuracy of the critical exponents $\nu$ and $\eta$. The convergence of the field expansion is also analyzed. We show in particular that its optimization does not coincide with optimization of the accuracy of the critical exponents.

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2026 2

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UNVERDICTED 2

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Activated dynamics in the quantum random field Ising model

cond-mat.dis-nn · 2026-06-30 · unverdicted · novelty 7.0

NP-FRG computation shows the quantum RFIM has activated dynamics ln τ ~ ξ^Ψ at T=0, with Ψ set by classical RFIM static exponents and bare kernel exponent σ, crossing over to thermal activation at finite T.

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  • Activated dynamics in the quantum random field Ising model cond-mat.dis-nn · 2026-06-30 · unverdicted · none · ref 74 · internal anchor

    NP-FRG computation shows the quantum RFIM has activated dynamics ln τ ~ ξ^Ψ at T=0, with Ψ set by classical RFIM static exponents and bare kernel exponent σ, crossing over to thermal activation at finite T.

  • Coarse graining from within: Wilson-Fisher universality on $S^3$ hep-th · 2026-06-02 · unverdicted · none · ref 22 · internal anchor

    A spectral cutoff RG flow on S^3 realizes the Wilson-Fisher universality class with one relevant direction and critical exponents close to flat-space values.