One-Dimensional Diffusions That Eventually Stop Down-Crossing

Abstract

Consider a diffusion process corresponding to the operator L=12ad2dx2+b ddx and which is transient to +∞. For c>0, we give an explicit criterion in terms of the coefficients a and b which determines whether or not the diffusion almost surely eventually stops making down-crossings of length c. As a particular case, we show that if a=1, then the diffusion almost surely stops making down-crossings of length c if b(x)12c x+γ c x, for some γ>1 and for large x, but makes down-crossings of length c at arbitrarily large times if b(x)12c x+1c x, for large x.