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arxiv: 2501.11387 · v1 · pith:NYKYLUQOnew · submitted 2025-01-20 · 🧮 math.AP

Universal approximations of quasilinear PDEs by finite distinguishable particle systems

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keywords distinguishablequasilinearsolutionssystemsapproximatedapproximationsdevelopmentsfinite
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In this paper, we prove that sufficiently regular solutions of any quasilinear PDE can be approximated by solutions of systems of N distinguishable particles, to within 1/ ln(N ). This intruiguing result is related to recent developments in graph limit theory.

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  1. From PDEs on standard domains to self-similar particle systems on fractals

    math.AP 2026-04 unverdicted novelty 7.0

    A method maps PDEs from the unit interval to self-similar fractals via isometry and nonlocal approximations, yielding self-similar particle systems for transport, Burgers, and heat equations.