Lower Bounds for Advection-Diffusion Equations: An Exploration with AI-Generated Proofs
Abstract
We establish explicit lower bounds for advection-diffusion equations in three settings: a polynomial H-1 bound for inviscid shears with u∈ L∞t W1,1y, a uniform positive lower bound on the mixing scale for diffusive shears, and an exponential L2 bound for rapidly oscillating time-periodic flows. All constants are explicit in the data. The proofs were generated entirely by a multi-agent math proving system, QED, without expert human intervention, serving as a test of AI's capability to produce rigorous mathematics.
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