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Strong solutions and sharp Euler--Maruyama approximations for SDEs with Lebesgue--Dini drift

Published 12 Feb 2026 in math.PR | (2602.12456v1)

Abstract: We investigate the strong approximation of stochastic differential equations whose drift is square-integrable in time and Dini continuous in space, while the diffusion coefficient is non-constant and uniformly elliptic. Using a refined Itô--Tanaka trick combined with parabolic regularity estimates, we first establish strong well-posedness and the stochastic flow property. Under additional Lipschitz regularity of the diffusion matrix, we then analyze a polygonal-type Euler--Maruyama scheme and prove the strong error estimate [ \Big|\sup_{0\le t\le1}|X_t-X_tn|\Big|_{Lp(Ω)} \le C n{-\frac12}\log(n){\frac32}, \quad p\ge2. ] We further show that this rate is sharp: even under smooth and uniformly elliptic diffusion coefficients with vanishing drift, the convergence order $1/2$ cannot be improved. These results provide the first sharp quantitative strong convergence estimates in a Lebesgue--Dini drift framework.

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