Construction of C^{β0} (β0<1/3) divergence-free vector fields and κ_q → 0 such that advection-diffusion scalars exhibit anomalous dissipation while remaining bounded in C^α0 with β0 + 2α0 < 1, confirming the Armstrong-Vicol conjecture.
Delgadino, and Tarek M
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Asymptotic relaxation enhancing flows are constructed to achieve arbitrarily fast convergence in Langevin sampling from Gibbs measures while preserving the invariant distribution.
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Scalar anomalous dissipation and optimal regularity via iterated homogenization
Construction of C^{β0} (β0<1/3) divergence-free vector fields and κ_q → 0 such that advection-diffusion scalars exhibit anomalous dissipation while remaining bounded in C^α0 with β0 + 2α0 < 1, confirming the Armstrong-Vicol conjecture.
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Accelerating sampling via asymptotic relaxation enhancing flows
Asymptotic relaxation enhancing flows are constructed to achieve arbitrarily fast convergence in Langevin sampling from Gibbs measures while preserving the invariant distribution.