We know from Levy's (uniform) modulus of continuity that for Brownian Motion, almost surely any sample path is locally Holder continuous for any $\rho <\frac{1}{2}$, i.e. $$ |W_t - W_s | \leq C(\omega) |t-s|^\rho$$ for some path-dependent constant $C(\omega)$. Now I'm wondering if there is a similar result for Ito process/semimartingale, which is of the form $$ dX_t = \mu_tdt + \sigma_tdW_t,$$ suppose $\mu_t$ and $\sigma_t$ satisfies any integrability condition (but may be random). I would like to emphasize here that I'm looking for the PATHWISE continuity instead of the moments.
2026-04-11 19:30:56.1775935856
modulus of continuity of Ito process
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