Derives heat-kernel bounds and Schauder estimates for SDEs with L^∞ C^β drifts in the Young regime via non-Levi parametrix, implying weak well-posedness, irreducibility and strong Feller property.
Multidimensional SDE with distributional drift and L \'evy noise
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On Heat kernel Estimtes for Brownian SDEs with Distributional Drift
Derives heat-kernel bounds and Schauder estimates for SDEs with L^∞ C^β drifts in the Young regime via non-Levi parametrix, implying weak well-posedness, irreducibility and strong Feller property.