A Note on the Convergence of Integral Functionals of Diffusion Processes. An Application to Strong Convergence

For a diffusion type process dX_t = dW_i + a(t, X)dt and a sequence (f_n) of nonnegative functions necessary and sufficient conditions to the f_n are established which guarantee the a.s. convergence of f_n(X_t)dt to zero. This result is applied to derive simple necessary and sufficient conditions for the strong convergence of distributions of diffusion processes formulated in terms of the corresponding drift functions.