Difference approximation of the local times of multidimensional diffusions

Sequences of additive functionals of difference approximations are considered for multidimensional uniformly nondegenerate diffusions. Sufficient conditions are obtained for the weak convergence of such sequences to a $W$-functional of the limit process. The class of $W$-functionals appearing as limits for such a problem can be described uniquely in terms of the corresponding $W$-measures $\mu$ as follows: \[ \lim _{\delta \downarrow 0}\sup _{x\in \mathbb {R}^m}\int _{\|y-x\|\leq \delta }w(\|y-x\|) \mu (dy)=0, \] where $w(r)=\begin {cases} \max (-\ln r, 1),& m=2,\\ r^{2-m},& m>2. \end {cases}$