Abstract
For a minimal diffusion process on $(a,b)$, any possible extension of it to a standard process on $[a,b]$ is characterized by the characteristic measures of excursions away from the boundary points $a$ and $b$. The generator of the extension is proved to be characterized by Feller's boundary condition.
Citation
Kouji Yano. "Extensions of diffusion processes on intervals and Feller's boundary conditions." Osaka J. Math. 51 (2) 375 - 405, April 2014.
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