We establish a small time large deviation principle and a Varadhan type asymptotics for Brownian motion with singular drift on
R
d
\mathbb {R}^d
with
d
≥
3
d\geq 3
whose infinitesimal generator is
1
2
Δ
+
μ
⋅
∇
\frac 12 \Delta + \mu \cdot \nabla
, where each
μ
i
\mu _i
of
μ
=
(
μ
1
,
…
,
μ
d
)
\mu = (\mu _1, \ldots , \mu _d)
is a measure in some suitable Kato class.