Let
B
B
be a plane curve given by an equation
F
(
X
0
,
X
1
,
X
2
)
=
0
F(X_{0}, X_{1}, X_{2}) = 0
, and let
B
a
B_{a}
be the affine plane curve given by
f
(
x
,
y
)
=
F
(
1
,
x
,
y
)
=
0
f(x, y) = F(1,x, y) = 0
. Let
S
n
S_{n}
denote a cyclic covering of
P
2
{\mathbf {P}}^{2}
determined by
z
n
=
f
(
x
,
y
)
z^{n} = f(x, y)
. The number
max
n
∈
N
(
dim
ℑ
(
S
n
→
Alb
(
S
n
)
)
)
\max _{ n \in {\mathbf {N}}} \left ( \operatorname {dim} \Im (S_{n} \to \operatorname {Alb} (S_{n})) \right )
is called the Albanese dimension of
B
a
B_{a}
. In this article, we shall give examples of
B
a
B_{a}
with the Albanese dimension 2.