Local H\"older continuity property of the Densities of Solutions of SDEs with Singular Coefficients
Abstract
We prove that the weak solution of a uniformly elliptic stochastic differential equation with locally smooth diffusion coefficient and H\"older continuous drift has a H\"older continuous density function. This result complements recent results of Fournier-Printems F1, where the density is shown to exist if both coefficients are H\"older continuous and exemplifies the role of the drift coefficient in the regularity of the density of a diffusion.
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